CA1052564A - Method for measuring the parameters of optical fibers - Google Patents
Method for measuring the parameters of optical fibersInfo
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- CA1052564A CA1052564A CA297,923A CA297923A CA1052564A CA 1052564 A CA1052564 A CA 1052564A CA 297923 A CA297923 A CA 297923A CA 1052564 A CA1052564 A CA 1052564A
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Abstract
METHOD FOR MEASURING THE PARAMETERS
OF OPTICAL FIBERS
Abstract of the Disclosure The present invention relates to a method of measuring the diameter, DC, of the core of a clad optical fiber, given the thickness of the cladding layer, t, and the refractive indices of the cladding and of the core, m1 and m2 respectively.
The method is comprised of directing a beam of spatially coherent, monochromatic radiation at the fiber thereby to generate a complex scattering pattern at least a portion of the pattern must include contributions from the diffraction, the reflection and the refraction of the beam by the fiber.
The scattering pattern is spatially, radially disposed about the fiber and has a fringe pattern intensity modulated superimposed thereon. The method further includes, at a given reference angle .THETA.R, measuring the modulation pattern over an angle range .DELTA..THETA.R, where .THETA.R satisfies the relationship .THETA.R + 1/2 .DELTA..THETA.R < .THETA.F, where .THETA.F is the cut-off angle which, in turn, satisfies the relation m1 cos(.THETA.F/2) = 1.
The method further includes the step of determining the core-to-fiber diameter ratio, R, by comparing the measured modulation pattern with modulation patterns priorly observed for clad optical fibers of the same core and cladding indices, measured at the same scattering angle range .DELTA.OR and then computing the core diameter DC from the equation DC = 2Rt(1 - R).
OF OPTICAL FIBERS
Abstract of the Disclosure The present invention relates to a method of measuring the diameter, DC, of the core of a clad optical fiber, given the thickness of the cladding layer, t, and the refractive indices of the cladding and of the core, m1 and m2 respectively.
The method is comprised of directing a beam of spatially coherent, monochromatic radiation at the fiber thereby to generate a complex scattering pattern at least a portion of the pattern must include contributions from the diffraction, the reflection and the refraction of the beam by the fiber.
The scattering pattern is spatially, radially disposed about the fiber and has a fringe pattern intensity modulated superimposed thereon. The method further includes, at a given reference angle .THETA.R, measuring the modulation pattern over an angle range .DELTA..THETA.R, where .THETA.R satisfies the relationship .THETA.R + 1/2 .DELTA..THETA.R < .THETA.F, where .THETA.F is the cut-off angle which, in turn, satisfies the relation m1 cos(.THETA.F/2) = 1.
The method further includes the step of determining the core-to-fiber diameter ratio, R, by comparing the measured modulation pattern with modulation patterns priorly observed for clad optical fibers of the same core and cladding indices, measured at the same scattering angle range .DELTA.OR and then computing the core diameter DC from the equation DC = 2Rt(1 - R).
Description
lC~S'~4 This is a division of copending Canadian patent application Serial No. 223,800 which was filed on 3 April 1975.
Background of the Lnvention 1. Field of the Invention Broadly speaking, this invention relates to methods for measuring the parameters of a filament. More particularly this invention relates to methods for measuring properties of cl~d optical fibers, and the like.
Background of the Lnvention 1. Field of the Invention Broadly speaking, this invention relates to methods for measuring the parameters of a filament. More particularly this invention relates to methods for measuring properties of cl~d optical fibers, and the like.
2. Discussion of the Prior Art 1~ In the manufacture of high quality optical fibers, for example, for use in optical communication systems, it is virtually mandatory that such important fiber parameters as core diameter and circularity, cladding thickness, and core and cladding refractive index be continuously monitored during the manufacturing process. Also, because an optical fiber is relatively fragile, it is important that the methods employed to measure these parameters do not damage the fiber in any way.
It is, of course, well known to employ a laser beam to measure the diameter of a fine metal wire. See, for example, Lasers in Industry, S. S. Charschan, editor, Van Nostrand Reinhold Co. (1973) page 393 et seq. As taught in that publication, a laser beam directed at the wire to be measured generates the far-field Fraunhofer diffraction pattern of the wire. By measuring the spacing between successive maxima and minima in the diffraction pattern, and knowing the wavelength of the laser beam, it is a relatively easy matter to compute the diameter of the wire.
U.S. Patent 3,709,610, which issued on January 9, 1973 in the name of Herman A. Kreugle, suggests ~(~5'Z564 that this known technique may also be applied to measure the diameter of transparent, thermo-plastic filaments, such as rayon, nylon and acetate yarn. In a gross sense, this is true, bear-ing in mind that such fibers are not truly transparent but are more properly described as translucent. Thus, while the dif-fraction pattern generated from such a filament is complex, including contributions to the pat~ern caused by internal refraction through the yarn, the end result is essentially the same diffraction pattern that would be generated by an opaque filament, albeit of reduced contrast. Indeed, the Kreugle patent discloses several techniques for successfully detecting this reduced contrast diffraction pattern, including the technique of dying the yarn to render it opaque. See also the article by W. A. Faroae and M. Kerker in the Journal of the Optical Society of-America, Vol. 56~ (1966) page 481 et seq., and the article by J. L. Lundberg in Journal of Colloid and_Interface Science, Vol. 29, No. 3 (March 1969) at page 565 et seq.
Unfortunately, the measurement techniques disclosed by Kreugle are totally unsuited for use on high quality optical fi~er. Firstly, because these fibers are designed for use in low-loss optical communication systems, they are far more transparent than the translucent yarns measured by Kreugle.
Thus, the contribution that the internally refracted rays make to the overall Fraunhofer pattern is considerably greater and cannot be ignored. In addition, reflection from the filament becomes increasingly significant and also cannot be ignored.
Because of this, Kreugle's basic assumption, that the complex diffraction pattern generated by a translucent yarn can be treated as if it were an ordinary diffraction pattern, is incorrect when _ . .
~OS;ZS64 applied to the measurement of an optical fiber. Secondly, measurement of the diffraction pattern, even if it could be resolved, would not be accurate enough since the optical fiber is at least one order of magnitude smaller in diameter. Pinally, and perhaps most important of all, an optical fiber typically comprises an inner core of a flrst refractive index and a thin outer cladding of a different refractive index. The measurement techniques disclosed by Kreugle, even if they could be applied to fiber optics, are incapable of measuring the thickness of the cladding layer and the core, or the relative refractive indices thereof, and at best, could merely measure the gross, overall diameter of the clad cable.
It is, however, known that a portion of a scattering ., .
pattern generated by a laser beam impinging on a transparent fiber can be used for measuring the diameter of the fiber. In this portion of the scattering pattern, interference between light reflected from the fiber and light refracted by the fiber causes fringes to appear. The distance between minima of the fringes is related to the diameter of the fiber. See "Interference Phenomena on Thin, Transparent Glass Filaments under Coherent Lighting," by Von Josef Gebhart and Siegfried Schmidt, Zeitschrift fur angewandte Physik, XIX. Band, Heft 2-1965.
The latter method is not shown to extend to clad fibers, however. It is desired to measure both the core diameter and the cladding diameter of clad fibers.
Summary_of the Invention The instant method solves the foregoing problem with a method of measuring the diameter of a core of a clad optical fiber. Given the refractive indices of the cladding and core, ml and m2, respectively, and the thickness o-f the ~ _ 3 _ ` l~SZ564 claddil-g layer, al-l)licant determ;lles the diameter DC of the core of the optical fiber by directing a beam of spatially coherent, monochrom2tic radiation at the fiber to generate a complex scattering pattern, at least a portion of the pattern includin~ contributions from the diffraction, the reflection and the refraction of the beam by the fiber. The scattering pattern is spatially radially disposed ab-out the fiber and has a fringe pattern intensity modulation superimposed thereon. At a given angle ~R~ the angular position of the modulation over an angle range ~R is measured, where ~R
satisifies the relationship:
~ R + 0 5 Q~R < ~F
and ~F is the cut-off angle which satisfies the relation:
F / 2 1 .
The core-to-fiber diameter ratio, R, is then determined by comparing the measured position with modulation positions priorly observed for clad optical fibers of the same core and cladding indices, measured at the same scattering angle.
The core diameter DC is then computed from the equation:
DC = 2Rt/(l - R)-Additionally, methods for measuring the cladding thickness and the deviation from concentricity of the core of the clad optical fiber, as well as a method of measuring the degree of non-circularity of a transparent filament àre disclosed.
In accordance with one aspect of the present invention there is provided a method of measuring the diameter, Dc, of the core of a clad optical fiber, given the thickness of the - 3a -B
~05;~5~4 cladd;llg layer, t, alld the refractive indices o~ thc clad~ing and core, ml alld m2, respectively, wh.ich compri.ses:
directing a beam of spatially coherent, monochromatic radiation at said fiber thereby to generate a complex scattering pattern, at least a portion of said pattern including contributions from the diffraction, the reflection and the refraction of said beam by said fiber, said scattering.pattern being spatially radially disposed about said fiber and having a fringe pattern intensity modulation : . 10 superimposed thereon;
, at a given reference angle ~R~ measuring the modulation pattern over an angle range ~R~ where ~R satisfies the relationship:
~3R + 1/2~R < ~F
and ~F is the cut-off angle which satisfies the relation:
ml cos (~F/2) = 1;
determining the core-to-fiber diameter ratio, R, by comparing said measured modulation pattern with modulation patterns priorly observed for clad optical fibers of the same core and cladding indices, measured at the same scattering angle range A~R; and then computing said core diameter DC from the equation:
DC = 2Rt/(l - ~).
The present invention taken in conjunction with the invention described in copénding Canadian patent application Serial No. 223,800, whicll was filed on 3 April 1975 will be described in detail hereinbelow with the aid of the accompanying drawings, in whicll:
Description of the Drawings FIG. 1 is an isometric view of a typical clad optical fiber;
, .
11~5'~564 Fig. 2 is a flow chart useful in calculating the scattering pattern of the fiber shown in Fig. l;
Fig. 3 is a graph which compares the predicted results of Lundberg with the core index equal to the cladding index, i.e., for an unclad fiber;
Fig. 4 is a cross-sectional view of an unclad fiber which is useful in deriving mathematical relations used herein;
Fig. 5 is a graph which compares the actual and predicted scattering patterns of the fiber over a selected angle range for polarization parallel to the fiber;
Fig. 6 is a graph showing the manner in which the geometric cut-off angle of the fiber varies as a function of fiber refractive index;
Fig. 7 is a graph similar to that shown in Fig. 5 but for another angle range;
Fig. 8 is a graph showing the scattering pattern of a fiber when perpendicularly polarized light is used to gen-erate the pattern;
Fig. 9 depic~s the classic sin diffraction pattern of an opaque fiber;
Fig. 10 is a graph depicting the forward scattering pattern of a noncircular unclad fiber;
Fig. 11 is a graph showing the predicted backward scattering pattern of an unclad fiber;
Fig. 12 is a graph showing the actual backward scattering pattern of an unclad fiber not perfectly circular in cross section;
Figs. 13-15 are graphs depicting the predicted scattering patterns for clad optical fibers of differing refractive index, over three separate angle ranges;
~OS;~S~ci4 Fig. 16 is a graph showing the number of frlnges present in the scattering pattern as a function of angle;
Fig. 17 is a drawing similar to Fig. 4 , but for a clad fiber;
Fig. 18 is a graph similar to Fig. 16, but for a different angle range;
Fig. 19 - 22 are graphs comparing the actual and predicted scattering patterns of a clad fiber, over three distinct angle ranges;
Figs. 23 - 26 are graphs similar to Figs. 19 - 22 for a different fiber over the same angle ranges;
Fig. 27 is a graph showing the scattering pattern of a clad fiber for differing refractive indices;
Fig. 28 depicts an illustrative apparatus for practicing the methods of this invention; and Fig. 29 depicts an alternative embodiment of the apparatus shown in Fig. 28.
Detailed Description of the~Invention Referring to Fig. 1, if a collimated, single trans-verse mode beam of radiant energy, for example, a laser beam,is directed at a transparent fiber, perpendicular to its axis 9 light is scattered in a plane which is perpendicular to the fiber axis. The intensity of the light scattered, as a function of the angle measured from the forward direction of the original beam, is characteristic of the size of the fiber and its re-fractive index, and, in the case of a clad fiber, the core diameter and its index of refraction as well.
As will be shown below, calculations have been performed to determine the theoretical characteristics of the scattered light and the relationship of these characteristics to the four parameters of core and cladding diameters and 1~5Z5~4 refractive indices. The results which were obtained using precise wave theory, as well as those from a more simplifled geometrical ray analysis, will be described. The validity of these results has been confirmed by comparison with experimentally measured light scattering patterns obtained by the use of a 0.633 ~m wavelength HeNe laser. In accordance with the invention, the scattering patterns so obtained may be used to measure critical fiber parameters, as will be more fully discussed below.
Fig. 1 is a diagram of an illustrative fiber and the coordinate axes which will be used throughout this speci-fication. The axis of the fiber is in the æ direction, and the incident plane monochromatic wave, for example, an HeNe laser beam, is directed along the x axis, in the positive-going direction. Cylindrical coordinates are used to describe the scattered light with r being the distance from the z axis of the fiber and ~ the angle from the x axis of the fiber. There-fore, as to any point in the xy plane, x = r cos ~, and, y = r sin3.
In this explanation, the incident light is assumed to be of constant amplitude, that is to say, the amplitude of the light does not fall off towards the edge of the field. This assumption is valid for typical optical fibers of 200 ~m diameter or less and laser beams of typically 2 mm diameter. Now, for light scattered in the forward direction,
It is, of course, well known to employ a laser beam to measure the diameter of a fine metal wire. See, for example, Lasers in Industry, S. S. Charschan, editor, Van Nostrand Reinhold Co. (1973) page 393 et seq. As taught in that publication, a laser beam directed at the wire to be measured generates the far-field Fraunhofer diffraction pattern of the wire. By measuring the spacing between successive maxima and minima in the diffraction pattern, and knowing the wavelength of the laser beam, it is a relatively easy matter to compute the diameter of the wire.
U.S. Patent 3,709,610, which issued on January 9, 1973 in the name of Herman A. Kreugle, suggests ~(~5'Z564 that this known technique may also be applied to measure the diameter of transparent, thermo-plastic filaments, such as rayon, nylon and acetate yarn. In a gross sense, this is true, bear-ing in mind that such fibers are not truly transparent but are more properly described as translucent. Thus, while the dif-fraction pattern generated from such a filament is complex, including contributions to the pat~ern caused by internal refraction through the yarn, the end result is essentially the same diffraction pattern that would be generated by an opaque filament, albeit of reduced contrast. Indeed, the Kreugle patent discloses several techniques for successfully detecting this reduced contrast diffraction pattern, including the technique of dying the yarn to render it opaque. See also the article by W. A. Faroae and M. Kerker in the Journal of the Optical Society of-America, Vol. 56~ (1966) page 481 et seq., and the article by J. L. Lundberg in Journal of Colloid and_Interface Science, Vol. 29, No. 3 (March 1969) at page 565 et seq.
Unfortunately, the measurement techniques disclosed by Kreugle are totally unsuited for use on high quality optical fi~er. Firstly, because these fibers are designed for use in low-loss optical communication systems, they are far more transparent than the translucent yarns measured by Kreugle.
Thus, the contribution that the internally refracted rays make to the overall Fraunhofer pattern is considerably greater and cannot be ignored. In addition, reflection from the filament becomes increasingly significant and also cannot be ignored.
Because of this, Kreugle's basic assumption, that the complex diffraction pattern generated by a translucent yarn can be treated as if it were an ordinary diffraction pattern, is incorrect when _ . .
~OS;ZS64 applied to the measurement of an optical fiber. Secondly, measurement of the diffraction pattern, even if it could be resolved, would not be accurate enough since the optical fiber is at least one order of magnitude smaller in diameter. Pinally, and perhaps most important of all, an optical fiber typically comprises an inner core of a flrst refractive index and a thin outer cladding of a different refractive index. The measurement techniques disclosed by Kreugle, even if they could be applied to fiber optics, are incapable of measuring the thickness of the cladding layer and the core, or the relative refractive indices thereof, and at best, could merely measure the gross, overall diameter of the clad cable.
It is, however, known that a portion of a scattering ., .
pattern generated by a laser beam impinging on a transparent fiber can be used for measuring the diameter of the fiber. In this portion of the scattering pattern, interference between light reflected from the fiber and light refracted by the fiber causes fringes to appear. The distance between minima of the fringes is related to the diameter of the fiber. See "Interference Phenomena on Thin, Transparent Glass Filaments under Coherent Lighting," by Von Josef Gebhart and Siegfried Schmidt, Zeitschrift fur angewandte Physik, XIX. Band, Heft 2-1965.
The latter method is not shown to extend to clad fibers, however. It is desired to measure both the core diameter and the cladding diameter of clad fibers.
Summary_of the Invention The instant method solves the foregoing problem with a method of measuring the diameter of a core of a clad optical fiber. Given the refractive indices of the cladding and core, ml and m2, respectively, and the thickness o-f the ~ _ 3 _ ` l~SZ564 claddil-g layer, al-l)licant determ;lles the diameter DC of the core of the optical fiber by directing a beam of spatially coherent, monochrom2tic radiation at the fiber to generate a complex scattering pattern, at least a portion of the pattern includin~ contributions from the diffraction, the reflection and the refraction of the beam by the fiber. The scattering pattern is spatially radially disposed ab-out the fiber and has a fringe pattern intensity modulation superimposed thereon. At a given angle ~R~ the angular position of the modulation over an angle range ~R is measured, where ~R
satisifies the relationship:
~ R + 0 5 Q~R < ~F
and ~F is the cut-off angle which satisfies the relation:
F / 2 1 .
The core-to-fiber diameter ratio, R, is then determined by comparing the measured position with modulation positions priorly observed for clad optical fibers of the same core and cladding indices, measured at the same scattering angle.
The core diameter DC is then computed from the equation:
DC = 2Rt/(l - R)-Additionally, methods for measuring the cladding thickness and the deviation from concentricity of the core of the clad optical fiber, as well as a method of measuring the degree of non-circularity of a transparent filament àre disclosed.
In accordance with one aspect of the present invention there is provided a method of measuring the diameter, Dc, of the core of a clad optical fiber, given the thickness of the - 3a -B
~05;~5~4 cladd;llg layer, t, alld the refractive indices o~ thc clad~ing and core, ml alld m2, respectively, wh.ich compri.ses:
directing a beam of spatially coherent, monochromatic radiation at said fiber thereby to generate a complex scattering pattern, at least a portion of said pattern including contributions from the diffraction, the reflection and the refraction of said beam by said fiber, said scattering.pattern being spatially radially disposed about said fiber and having a fringe pattern intensity modulation : . 10 superimposed thereon;
, at a given reference angle ~R~ measuring the modulation pattern over an angle range ~R~ where ~R satisfies the relationship:
~3R + 1/2~R < ~F
and ~F is the cut-off angle which satisfies the relation:
ml cos (~F/2) = 1;
determining the core-to-fiber diameter ratio, R, by comparing said measured modulation pattern with modulation patterns priorly observed for clad optical fibers of the same core and cladding indices, measured at the same scattering angle range A~R; and then computing said core diameter DC from the equation:
DC = 2Rt/(l - ~).
The present invention taken in conjunction with the invention described in copénding Canadian patent application Serial No. 223,800, whicll was filed on 3 April 1975 will be described in detail hereinbelow with the aid of the accompanying drawings, in whicll:
Description of the Drawings FIG. 1 is an isometric view of a typical clad optical fiber;
, .
11~5'~564 Fig. 2 is a flow chart useful in calculating the scattering pattern of the fiber shown in Fig. l;
Fig. 3 is a graph which compares the predicted results of Lundberg with the core index equal to the cladding index, i.e., for an unclad fiber;
Fig. 4 is a cross-sectional view of an unclad fiber which is useful in deriving mathematical relations used herein;
Fig. 5 is a graph which compares the actual and predicted scattering patterns of the fiber over a selected angle range for polarization parallel to the fiber;
Fig. 6 is a graph showing the manner in which the geometric cut-off angle of the fiber varies as a function of fiber refractive index;
Fig. 7 is a graph similar to that shown in Fig. 5 but for another angle range;
Fig. 8 is a graph showing the scattering pattern of a fiber when perpendicularly polarized light is used to gen-erate the pattern;
Fig. 9 depic~s the classic sin diffraction pattern of an opaque fiber;
Fig. 10 is a graph depicting the forward scattering pattern of a noncircular unclad fiber;
Fig. 11 is a graph showing the predicted backward scattering pattern of an unclad fiber;
Fig. 12 is a graph showing the actual backward scattering pattern of an unclad fiber not perfectly circular in cross section;
Figs. 13-15 are graphs depicting the predicted scattering patterns for clad optical fibers of differing refractive index, over three separate angle ranges;
~OS;~S~ci4 Fig. 16 is a graph showing the number of frlnges present in the scattering pattern as a function of angle;
Fig. 17 is a drawing similar to Fig. 4 , but for a clad fiber;
Fig. 18 is a graph similar to Fig. 16, but for a different angle range;
Fig. 19 - 22 are graphs comparing the actual and predicted scattering patterns of a clad fiber, over three distinct angle ranges;
Figs. 23 - 26 are graphs similar to Figs. 19 - 22 for a different fiber over the same angle ranges;
Fig. 27 is a graph showing the scattering pattern of a clad fiber for differing refractive indices;
Fig. 28 depicts an illustrative apparatus for practicing the methods of this invention; and Fig. 29 depicts an alternative embodiment of the apparatus shown in Fig. 28.
Detailed Description of the~Invention Referring to Fig. 1, if a collimated, single trans-verse mode beam of radiant energy, for example, a laser beam,is directed at a transparent fiber, perpendicular to its axis 9 light is scattered in a plane which is perpendicular to the fiber axis. The intensity of the light scattered, as a function of the angle measured from the forward direction of the original beam, is characteristic of the size of the fiber and its re-fractive index, and, in the case of a clad fiber, the core diameter and its index of refraction as well.
As will be shown below, calculations have been performed to determine the theoretical characteristics of the scattered light and the relationship of these characteristics to the four parameters of core and cladding diameters and 1~5Z5~4 refractive indices. The results which were obtained using precise wave theory, as well as those from a more simplifled geometrical ray analysis, will be described. The validity of these results has been confirmed by comparison with experimentally measured light scattering patterns obtained by the use of a 0.633 ~m wavelength HeNe laser. In accordance with the invention, the scattering patterns so obtained may be used to measure critical fiber parameters, as will be more fully discussed below.
Fig. 1 is a diagram of an illustrative fiber and the coordinate axes which will be used throughout this speci-fication. The axis of the fiber is in the æ direction, and the incident plane monochromatic wave, for example, an HeNe laser beam, is directed along the x axis, in the positive-going direction. Cylindrical coordinates are used to describe the scattered light with r being the distance from the z axis of the fiber and ~ the angle from the x axis of the fiber. There-fore, as to any point in the xy plane, x = r cos ~, and, y = r sin3.
In this explanation, the incident light is assumed to be of constant amplitude, that is to say, the amplitude of the light does not fall off towards the edge of the field. This assumption is valid for typical optical fibers of 200 ~m diameter or less and laser beams of typically 2 mm diameter. Now, for light scattered in the forward direction,
3 = 0, and for light scattered in the backward direction, ~ = 180. The radius of the fiber core is a, and the core has a refractive index m2; the radius of the total fiber is b with the cladding layer having an index of refraction ml. Thus, the cladding layer has a thickness c = (b - a).
The solution of equations descriptive of the scat-tering of electromagnetic waves by a clad optical fiber made lC~S'~5~4 of nonabsorbing material has been reported by M. Kerker and E. Matijevic in the Journal of the Optical Society of A~erica, Vol. 51 (1961) pg. 506, who jointly extended the theory des-cribed by H. C. VanDerHulst in, Light Scattering from Small Particles, John Wiley and Sons, New York (1951), which theory covered scattering from dielectric cylinders (i.e., unclad optical fibers). The solution is derived by forming appropriate solutions of the scalar wave equation for three regions:
(1) in the fiber core; (2) in the cladding; and (3)outside the fiber. This is done separately for each of the two polari-zations: (a) parallel to the fiber axis; and ~b) perpendi-cular to the fiber axis. The solutions are given below for the case of electric-field polarization which is parallel to th~: fiber axis.
(r>b) u = ~ Fn[Jn(kr) - bn Hn(kr)] (1) (b>r>a) u = E Fn IBn Jn(mlkr) - bn Hn(mlkr) ] (2) (r<a) u = ~ Fn [Bn J(m2kr) ] (3) where u is the resulting field amplitude at r, ~; k = 2~
is the wavelength of the radiation, Jn is the Bessel function of the first kind, Hn is the Hankel function of the second kind and bn ~ B 1, b 1, B are complex coefficients.
In equation (1) the first term represents the incident wave and the second term the soattered wave. The incident wave is a plane wave expressed in the form ~ = eiwt ikx = ~ F J (kr) (4) where Fn = (-l)nein~ + iwt The complex coefficient bn is found by using the boundary conditions that mu and mau/ar are to be continuous lQ5Z564 at the core/cladding and cladding/air interfaces. This leads to a set of four equations from which the coefficient is found:
Jn(l) Hn(mll) J (m a ) o Jn (al) ml8n (mlal) mlJn'(mll) o : 0Hn(mla2)Jn(mla2) n( 2 2) Om H ' (m a )mlJn(mla2) m2Jn'(m2a2) b = ~ (5) Hn(~l) n( 1 1)n(mlal) Hn' (al)mlHn (mlal)mlJn' (mlal) O
I) Hn(mla2)Jn(mla2) Jn(m2a2) mlHn (mla2)mlJn~ (mla2) m2Jn~ (m2a2) where 1 = kb and a 2 = ka.
The scattered light intensity is given by the second term in Equation (1). Since the scattered light is to be observed at some distance from the fiber, the asymptotic expression for Hn(kr) can be used. The intensity for the scattered light is thus Ip.
I = 1 2 e(-ikr + iwt - i34) ~ b ein~
P ~kr n=-~ n = 2 ¦ bo + 2 ~ bn cos (n~ (6) since b = b -n n Similar results can be found for the light scattered when the incident radiation is polariæed perpendicular to fiber axis, but these are not given here for brevity.
Of course, Equation (6) may be solved manually, but in view of the large number of points which must be plotted to obtain a useful scattering pattern, a manual solution is g 1~5'~5~4 tedious. Accordlngly, I found it preferable to employ a com-puter to perform the repetitive calculations necessary to solve Equation (6).
Fig. 2 shows the flow diagram which I employed to calculate the scattering intensity from Equation (6). It must be emphasized that this flow chart is trivial and forms no part of the invention; neither does the computer program which was written to implement this flow chart, which program is entirely routine, and well within the skill of any compet~nt pragrammer.
Some interesting scaling problems were experienced in solving Equation (6) in this manner, and these will now be discussed, for the sake of completeness. In practice, the terms in Equation (6) tend to become zero for large values of n. It was found that in order to achieve this resuit, which greatly simplifies the mathematics, the number of terms, n, had to be greater than 40 for small diameter fibers and greater than 1.2 ml b2~/~ for larger diameter fibers. This con-clusion was checked by simply calculating the contribution made to the diffraction pattern by the last lO percent of the terms in Equation (6) and then keeping this contribution at a figure of less than 10 . The J Bessel functions were then calculated using the downward recursion formula:
YJQ l (a) = 2ny/ JQ() ~ YJQ+l(~)- (7) An arbitrarily small value of 10 30 was used for yJQ and Q was made sufficiently large, by trial and error, until repeatable results were obtained. For small arguments ( <100), Q was made 2.8 n + 11, as suggested by Lundberg.
For large ~,Q was stated at 1.2 n. After recurring down to yJo, the proportional constant y was found from the sum:
`~ 105;~5~4 p=l 2p (8) The values of Jo up to an argument a= 50 were confirmed by checking them against results published in standard Bessel Function Tables. For large values of Q it was found that during recurrence, ~J attained very large values exceeding the range of the computer. I, thus, found it necessary to use a scaling factor to keep the values within range. It was necessary to keep track of this scaling factor since the values of J for large Q might contribute a significant amount to the later computations even though their values were exceedingly small.
Finally, the values of J were returned to the main program in logarithmic form. This was found to be the easiest way to handle the large range of numbers. The sign was carried in a separate function.
The Hankel function Hn is given by :
n Jn iYn (9) where Y is the Bessel function of the second kind. Y was n o calculated by the asymptotic expansion:
( ) ( 2) / [sin ( a - 4 ) {1 - ~
(-1)(-9)(-25)(-49) _ ..}
The solution of equations descriptive of the scat-tering of electromagnetic waves by a clad optical fiber made lC~S'~5~4 of nonabsorbing material has been reported by M. Kerker and E. Matijevic in the Journal of the Optical Society of A~erica, Vol. 51 (1961) pg. 506, who jointly extended the theory des-cribed by H. C. VanDerHulst in, Light Scattering from Small Particles, John Wiley and Sons, New York (1951), which theory covered scattering from dielectric cylinders (i.e., unclad optical fibers). The solution is derived by forming appropriate solutions of the scalar wave equation for three regions:
(1) in the fiber core; (2) in the cladding; and (3)outside the fiber. This is done separately for each of the two polari-zations: (a) parallel to the fiber axis; and ~b) perpendi-cular to the fiber axis. The solutions are given below for the case of electric-field polarization which is parallel to th~: fiber axis.
(r>b) u = ~ Fn[Jn(kr) - bn Hn(kr)] (1) (b>r>a) u = E Fn IBn Jn(mlkr) - bn Hn(mlkr) ] (2) (r<a) u = ~ Fn [Bn J(m2kr) ] (3) where u is the resulting field amplitude at r, ~; k = 2~
is the wavelength of the radiation, Jn is the Bessel function of the first kind, Hn is the Hankel function of the second kind and bn ~ B 1, b 1, B are complex coefficients.
In equation (1) the first term represents the incident wave and the second term the soattered wave. The incident wave is a plane wave expressed in the form ~ = eiwt ikx = ~ F J (kr) (4) where Fn = (-l)nein~ + iwt The complex coefficient bn is found by using the boundary conditions that mu and mau/ar are to be continuous lQ5Z564 at the core/cladding and cladding/air interfaces. This leads to a set of four equations from which the coefficient is found:
Jn(l) Hn(mll) J (m a ) o Jn (al) ml8n (mlal) mlJn'(mll) o : 0Hn(mla2)Jn(mla2) n( 2 2) Om H ' (m a )mlJn(mla2) m2Jn'(m2a2) b = ~ (5) Hn(~l) n( 1 1)n(mlal) Hn' (al)mlHn (mlal)mlJn' (mlal) O
I) Hn(mla2)Jn(mla2) Jn(m2a2) mlHn (mla2)mlJn~ (mla2) m2Jn~ (m2a2) where 1 = kb and a 2 = ka.
The scattered light intensity is given by the second term in Equation (1). Since the scattered light is to be observed at some distance from the fiber, the asymptotic expression for Hn(kr) can be used. The intensity for the scattered light is thus Ip.
I = 1 2 e(-ikr + iwt - i34) ~ b ein~
P ~kr n=-~ n = 2 ¦ bo + 2 ~ bn cos (n~ (6) since b = b -n n Similar results can be found for the light scattered when the incident radiation is polariæed perpendicular to fiber axis, but these are not given here for brevity.
Of course, Equation (6) may be solved manually, but in view of the large number of points which must be plotted to obtain a useful scattering pattern, a manual solution is g 1~5'~5~4 tedious. Accordlngly, I found it preferable to employ a com-puter to perform the repetitive calculations necessary to solve Equation (6).
Fig. 2 shows the flow diagram which I employed to calculate the scattering intensity from Equation (6). It must be emphasized that this flow chart is trivial and forms no part of the invention; neither does the computer program which was written to implement this flow chart, which program is entirely routine, and well within the skill of any compet~nt pragrammer.
Some interesting scaling problems were experienced in solving Equation (6) in this manner, and these will now be discussed, for the sake of completeness. In practice, the terms in Equation (6) tend to become zero for large values of n. It was found that in order to achieve this resuit, which greatly simplifies the mathematics, the number of terms, n, had to be greater than 40 for small diameter fibers and greater than 1.2 ml b2~/~ for larger diameter fibers. This con-clusion was checked by simply calculating the contribution made to the diffraction pattern by the last lO percent of the terms in Equation (6) and then keeping this contribution at a figure of less than 10 . The J Bessel functions were then calculated using the downward recursion formula:
YJQ l (a) = 2ny/ JQ() ~ YJQ+l(~)- (7) An arbitrarily small value of 10 30 was used for yJQ and Q was made sufficiently large, by trial and error, until repeatable results were obtained. For small arguments ( <100), Q was made 2.8 n + 11, as suggested by Lundberg.
For large ~,Q was stated at 1.2 n. After recurring down to yJo, the proportional constant y was found from the sum:
`~ 105;~5~4 p=l 2p (8) The values of Jo up to an argument a= 50 were confirmed by checking them against results published in standard Bessel Function Tables. For large values of Q it was found that during recurrence, ~J attained very large values exceeding the range of the computer. I, thus, found it necessary to use a scaling factor to keep the values within range. It was necessary to keep track of this scaling factor since the values of J for large Q might contribute a significant amount to the later computations even though their values were exceedingly small.
Finally, the values of J were returned to the main program in logarithmic form. This was found to be the easiest way to handle the large range of numbers. The sign was carried in a separate function.
The Hankel function Hn is given by :
n Jn iYn (9) where Y is the Bessel function of the second kind. Y was n o calculated by the asymptotic expansion:
( ) ( 2) / [sin ( a - 4 ) {1 - ~
(-1)(-9)(-25)(-49) _ ..}
4!(8~) + cos (~ ~ 4) {(8~ ( 8 )3 (10) Subsequent values of YQ were calculated using the Wronskian relation, which is reported to yield slightly more accurate results than are obtained by using upward recurrence. This relationship is:
Q ) Q+l (a) - JQ+l(a) YQ() = -2/a~ (11) Derivatives for both J and Y were calculated from the equation:
CQ'(a) = CQ_l(a) - Q/ CQ(a). (12) 1~5;~564 Again, all the values were returned to the main program ln logarithmic form since YQ attains very large values for large Q.
The individual terms of the numerator and denominator determinants were also computed in logarithmic form. They were then converted to standard form with a common scaling factor and the determinants calculated. After the final division to obtain bn or an, the scaling was removed to give the final value. In this way, the coefficients were calculated without exceeding the range of the computer or losing terms which contribute significantly to the final result, even though their values at a particuIar point were very small.
Finally, the scattering functions were calculated using Equation t6). It is interesting to note that to cal-culate 256 points for a clad optical fiber of 160 ~ diameter took only 30 minutes on an IBM 360/50 computer, using double precision, which amply justifies the time taken to write the necessary computer program.
By using an arbitrary core size ranging from zero to the-total fiber size and by making the refractive index of the core equal to the refractive index of the cladding layer9 the program employed also gave results for unclad fibers.
This relationship was employed to check the validity and op-eration of the computer program used. For example, if the core size is varied, no variation in the scattering pattern should occur. Secondly, the results of any computer run may be com-pared with those published by others, for example Lundberg.
Fig. 3 shows a plot of Lundberg's calculated results for an unclad fiber together with comparable results from the program Ilemployed superimposed thereon. This graph confirms that the program yields the correct results for fiber sizes of about 30 ~m. It was also found that varying the core size ln `` 1(~5;~5~4 no way affect the results at all provided that the refractiveindices of the core and cladding were maintained at the same value.
In accordance with the invention, I have dis-covered that there are two distinct regions of significance in the scattering pattern shown in Fig. 3. I have further discovered that these two regions may advantageously be employed in the performance of certain of the measurements to be dis-cussed below.
16~5'Z56~
As shown in FIG. 3, beyond about 7, the scattering pattern varies in intensity in a sinusoidal fashion as ~
function of the scattering angle. The period of this variation ls relatively constant and, as will be seen later, iæ inversely related to the fiber diameter.
The behavior of this fringe pattern can be explained in a simple geometric manner by referring to FIG. 4. As shown, there are two paths by which light rays can be bent to a direction e from the axis. One path is by reflection from the surface of the fiber, the other is by refraction through the fiber. Interference between these rays, whose path lengths vary with changes in the value of e, causes the observed fringe pattern. The derivation of the equation which gives the path difference A between the reflected and refracted beams for an unclad fiber is set forth below.
Referring again to FIG. 4, by tracing rays along the wave normals in a beam, it is possible to calculate the path lengths of the waves. The object, therefore, is to trace two rays that both leave the fiber at an angle e, one of which is refracted through the fiber and the other of which is reflected from it, as shown in FIG. 4. Since these two rays both leave the fiber at an angle e, in the far field there will be interference between the two waves represented by these rays. This geometric ray approach has some limitations, two of which must be considered here. As taught by VanDerHulst, one limitation is that the fiber must be large compared to the wavelength of the light. The second is that if rays converge to a focus, a region of infinite energy is produced. Here the geometric approach breaks down, since the waves in this focal region are no longer normal to the geometric rays.
VanDerHulst states that if the rays pass through a focal line, lOS~S64 such as F, in FIG. 4, then the phase of that ray must be advanced by ~/2 radians, which is equivalent to shortening the path length by a quarter wave (~/4).
The ray incidence angle is given by Snell's law for a particular scattering angle ~, by the equation:
sin ~ = m sin (~ - e/2) (13) where m is the index of refraction. This can be rewritten in the following way, which will be more convenient for use in later calculations.
tan a = m sin (~/2)/[m cos (~/2) 1] (14) The optical path length of the refracted ray is p - ~/4 where p = 2 mb cos (a ~/2) (15) b is the fiber radius, and A is the wavelength of the light.
The A/4 term is included since this ray passes through a focal line. The optical path of the reflected ray to the same relative positions is 2u + Aj2 where:
u = b cos - b sin (e/2) (16) and the term A/2 is included to account for reflection.
Thus, the optical path difference, ~, between the reflected and refracted ray is given by:
~ = p - 2u + A/4 (17) Substituting equations (15) and (16) into equation (17):
= 2[mb cos [a - (~/2?] - b cos ~ + b sin (e/2)~ + A/4 (18) Using trigonometric relationships between ~ and ~ derived from equation (14), equation (18) can be rewritten ~ = d [sin (~/2) + ~m2 + 1 - 2m cos (~/2) ] + A/4 (19) where d = 2b is the diameter of the fiber.
The path-length difference A varies as a function ` lV5;~5~j4 - of scattering angle e and fiber diameter d. ~t a given scattering angle e, if ~ is an integral number of wavelengths of the incident beam, the corresponding reflected and refracted waves interfere to produce a maximum in the scattering pattern.
Conversely, if ~ is an integral number of wavelengths minus a half wavelength of the incident beam, the corresponding waves interfere to produce a minimum in the scattering pattern. Thus, if a change in e results in a change in ~ of one wavelength, that change in e will encompass one fringe in the scattering pattern.
The change in ~ as e is varied between a lower scattering angle el and an upper scattering angle e2 can be measured by counting the number of fringes in the scattering pattern between these angles and multiplying by the wavelength of the incident light. Thus, N~ (e2) = d[E(e2)] - d[E(el)] (20) _ where E(el) = sin (el/2) + ~m + 1 - 2m cos (el/2) and E(e2) = sin (e2/2) + m + l - 2m cos (e2/2) Equation (20) can be rearranged as d = N~/[E(e2) - E(el)] (21) to express fiber diameter d as a function of the number of fringes N. Of course, as used throughout this specification, and in the claims, the expression "counting the number of fringes" includes counting fractional parts thereof and is not restricted to an integral number of fringes.
Now, angle ~ is the incidence angle of the refracted ray. This has a maximum value of ~/2 which establishes an upper limit on the validity of equation (21). It can be shown using equation (14) that this limit can be expressed in terms ~ - 16 -1(~5Z~4 of upper scattering angle ~2. The condition is:
m cos e2/2 > 1 (22) which can also be written e2 < 2 cos (l/m) (23) Thus, for a scattering angle greater than the maximum given by Equation ~23), the fringe pattern should disappear. For a quartz, unclad fiber, this cut-off angle, which I call ~F~
should be eF = 93 3; for a glass fiber of index 1.52, eF = 97.6~, and for a glass fiber of index 1.62, eF = 103.8.
-For fiber diameter measurements, then, it is necessary that:
e2 ' eF
~ 16a ~ 105'~5~j4 Fig. 5 shows an experimentally measured scattering pattern, together with a best fit theoretical pattern, for the scattering angle range of 70 - 105, for a 29 ~m unclad, fused silica fiber with light polarized parallel to the fiber axis. The discrepancies between the theoretical and experi-mental patterns will be discussed later. What is apparent, however, is that although the fringe pattern does fade out, it has a gradual decay without a sharp discontinuity and so could not be used to accurately determine the refractive index of a fiber. Fig. 6 is a plot of the cut-off angle ~F vs.
refractive index and shows the quite large variation of cut-- off angle ~F with refractive index. Fig. 7 is a scattering pattern similar to that shown in Fig. 5, except that it is for the scattering range of 35 - 105.
The best fit theoretical patterns shown in Figs.
Q ) Q+l (a) - JQ+l(a) YQ() = -2/a~ (11) Derivatives for both J and Y were calculated from the equation:
CQ'(a) = CQ_l(a) - Q/ CQ(a). (12) 1~5;~564 Again, all the values were returned to the main program ln logarithmic form since YQ attains very large values for large Q.
The individual terms of the numerator and denominator determinants were also computed in logarithmic form. They were then converted to standard form with a common scaling factor and the determinants calculated. After the final division to obtain bn or an, the scaling was removed to give the final value. In this way, the coefficients were calculated without exceeding the range of the computer or losing terms which contribute significantly to the final result, even though their values at a particuIar point were very small.
Finally, the scattering functions were calculated using Equation t6). It is interesting to note that to cal-culate 256 points for a clad optical fiber of 160 ~ diameter took only 30 minutes on an IBM 360/50 computer, using double precision, which amply justifies the time taken to write the necessary computer program.
By using an arbitrary core size ranging from zero to the-total fiber size and by making the refractive index of the core equal to the refractive index of the cladding layer9 the program employed also gave results for unclad fibers.
This relationship was employed to check the validity and op-eration of the computer program used. For example, if the core size is varied, no variation in the scattering pattern should occur. Secondly, the results of any computer run may be com-pared with those published by others, for example Lundberg.
Fig. 3 shows a plot of Lundberg's calculated results for an unclad fiber together with comparable results from the program Ilemployed superimposed thereon. This graph confirms that the program yields the correct results for fiber sizes of about 30 ~m. It was also found that varying the core size ln `` 1(~5;~5~4 no way affect the results at all provided that the refractiveindices of the core and cladding were maintained at the same value.
In accordance with the invention, I have dis-covered that there are two distinct regions of significance in the scattering pattern shown in Fig. 3. I have further discovered that these two regions may advantageously be employed in the performance of certain of the measurements to be dis-cussed below.
16~5'Z56~
As shown in FIG. 3, beyond about 7, the scattering pattern varies in intensity in a sinusoidal fashion as ~
function of the scattering angle. The period of this variation ls relatively constant and, as will be seen later, iæ inversely related to the fiber diameter.
The behavior of this fringe pattern can be explained in a simple geometric manner by referring to FIG. 4. As shown, there are two paths by which light rays can be bent to a direction e from the axis. One path is by reflection from the surface of the fiber, the other is by refraction through the fiber. Interference between these rays, whose path lengths vary with changes in the value of e, causes the observed fringe pattern. The derivation of the equation which gives the path difference A between the reflected and refracted beams for an unclad fiber is set forth below.
Referring again to FIG. 4, by tracing rays along the wave normals in a beam, it is possible to calculate the path lengths of the waves. The object, therefore, is to trace two rays that both leave the fiber at an angle e, one of which is refracted through the fiber and the other of which is reflected from it, as shown in FIG. 4. Since these two rays both leave the fiber at an angle e, in the far field there will be interference between the two waves represented by these rays. This geometric ray approach has some limitations, two of which must be considered here. As taught by VanDerHulst, one limitation is that the fiber must be large compared to the wavelength of the light. The second is that if rays converge to a focus, a region of infinite energy is produced. Here the geometric approach breaks down, since the waves in this focal region are no longer normal to the geometric rays.
VanDerHulst states that if the rays pass through a focal line, lOS~S64 such as F, in FIG. 4, then the phase of that ray must be advanced by ~/2 radians, which is equivalent to shortening the path length by a quarter wave (~/4).
The ray incidence angle is given by Snell's law for a particular scattering angle ~, by the equation:
sin ~ = m sin (~ - e/2) (13) where m is the index of refraction. This can be rewritten in the following way, which will be more convenient for use in later calculations.
tan a = m sin (~/2)/[m cos (~/2) 1] (14) The optical path length of the refracted ray is p - ~/4 where p = 2 mb cos (a ~/2) (15) b is the fiber radius, and A is the wavelength of the light.
The A/4 term is included since this ray passes through a focal line. The optical path of the reflected ray to the same relative positions is 2u + Aj2 where:
u = b cos - b sin (e/2) (16) and the term A/2 is included to account for reflection.
Thus, the optical path difference, ~, between the reflected and refracted ray is given by:
~ = p - 2u + A/4 (17) Substituting equations (15) and (16) into equation (17):
= 2[mb cos [a - (~/2?] - b cos ~ + b sin (e/2)~ + A/4 (18) Using trigonometric relationships between ~ and ~ derived from equation (14), equation (18) can be rewritten ~ = d [sin (~/2) + ~m2 + 1 - 2m cos (~/2) ] + A/4 (19) where d = 2b is the diameter of the fiber.
The path-length difference A varies as a function ` lV5;~5~j4 - of scattering angle e and fiber diameter d. ~t a given scattering angle e, if ~ is an integral number of wavelengths of the incident beam, the corresponding reflected and refracted waves interfere to produce a maximum in the scattering pattern.
Conversely, if ~ is an integral number of wavelengths minus a half wavelength of the incident beam, the corresponding waves interfere to produce a minimum in the scattering pattern. Thus, if a change in e results in a change in ~ of one wavelength, that change in e will encompass one fringe in the scattering pattern.
The change in ~ as e is varied between a lower scattering angle el and an upper scattering angle e2 can be measured by counting the number of fringes in the scattering pattern between these angles and multiplying by the wavelength of the incident light. Thus, N~ (e2) = d[E(e2)] - d[E(el)] (20) _ where E(el) = sin (el/2) + ~m + 1 - 2m cos (el/2) and E(e2) = sin (e2/2) + m + l - 2m cos (e2/2) Equation (20) can be rearranged as d = N~/[E(e2) - E(el)] (21) to express fiber diameter d as a function of the number of fringes N. Of course, as used throughout this specification, and in the claims, the expression "counting the number of fringes" includes counting fractional parts thereof and is not restricted to an integral number of fringes.
Now, angle ~ is the incidence angle of the refracted ray. This has a maximum value of ~/2 which establishes an upper limit on the validity of equation (21). It can be shown using equation (14) that this limit can be expressed in terms ~ - 16 -1(~5Z~4 of upper scattering angle ~2. The condition is:
m cos e2/2 > 1 (22) which can also be written e2 < 2 cos (l/m) (23) Thus, for a scattering angle greater than the maximum given by Equation ~23), the fringe pattern should disappear. For a quartz, unclad fiber, this cut-off angle, which I call ~F~
should be eF = 93 3; for a glass fiber of index 1.52, eF = 97.6~, and for a glass fiber of index 1.62, eF = 103.8.
-For fiber diameter measurements, then, it is necessary that:
e2 ' eF
~ 16a ~ 105'~5~j4 Fig. 5 shows an experimentally measured scattering pattern, together with a best fit theoretical pattern, for the scattering angle range of 70 - 105, for a 29 ~m unclad, fused silica fiber with light polarized parallel to the fiber axis. The discrepancies between the theoretical and experi-mental patterns will be discussed later. What is apparent, however, is that although the fringe pattern does fade out, it has a gradual decay without a sharp discontinuity and so could not be used to accurately determine the refractive index of a fiber. Fig. 6 is a plot of the cut-off angle ~F vs.
refractive index and shows the quite large variation of cut-- off angle ~F with refractive index. Fig. 7 is a scattering pattern similar to that shown in Fig. 5, except that it is for the scattering range of 35 - 105.
The best fit theoretical patterns shown in Figs.
5 and 7 were found by matching as closely as possible the positions of the maxima and minima of the patterns over the 35 - 105 range. The intensity comparison is somewhat ar-bitrary and was made e~ual at the maximum, which occurred at approximately 74. Thus, absolute comparisons between intensityshould not be made; just comparisons between their variations in intensity.
As previously mentioned, discrepancies between the theoretical and the experimental patterns in Fig. 5 were noted. It is believed that these are most probably due to the particular fused silica fiber sample which was employed for the experiment, which upon later examination, was found not to be perfectly circular in cross-section. The effect of this non-circularity is to give a variation in intensity of the maxima and also to give small deviations of the fringe position with respect to angle. This observation suggested to me a `` 1~5~St~4 technique for measuring fiber non-circularity. For example, at the given reference angles, +~R and -~R~ one compares the fringe patterns present in the angle range ~R. If the fiber is non-circular, bdth fringe patterns will be offset to the right (or left). That is to say, one fringe pattern will be closer to the origin (~=0) than theory predicts, while the other pattern will be correspondingly further away from the origin. The degree of relative pattern shift is, of course, proportional to the fiber non-circularity, and if the system is calibrated with fibers of known eccentricity, the non-circularity of an unknown fiber may readily be ascertained.
For fibers with larger eccentricities, fringe counts on each side of the fiber can also be made.
As discussed, Fig. 7 is a comparison of theory and experiment for the scattered intensity over the angle range 35 - 70 for the same fiber used in Fig. 5, again for the case of parallel polarization. The same discrepancies which were noted in Fig. 5 between theory and experiment were found in Fig. 7 and are also believed to be due to the elliptical, non-circular fiber cross-section. However, this latter plot demonstrates the high contrast fringes which may be obtained. Calculations also show that the maxima and minima positions predicted by Equation (18) are correct over the angle range from ~7 to QF.
Fig. 8 shows the theoretical plot for the case of incident light polarized perpendicular to the fiber axis.
The same fringes are present; however, the contrast is considerably less and even approaches zero at one angle.
This lower fringe contrast was confirmed in the 16~5;Z5t~4 experimentally derived scattering patterns. Thus, although perpendicular polarization may be used in any of the measurement techniques disclosed herein, because of the low-fringe contrast which makes accurate measurements difficult, the preferred polarization is parallel to the fiber axis.
For the region ~ = 0 to ~ = 7, there is yet ano~her effect which superimposes itself on the interference effects discussed above, that is, the diffraction of light which is not intercepted by the fiber. If the fiber were opaque then the diffraction pattern in the far field would have an intensity distribution as shown in FIG. 9. This is, of course, the classic sin distribution caused by the bending of the light transmitted at the edge of the opaque object by virtue of the wave properties of light, and is the basis of the prior art opaque filament measuring techniques discussed in the introduction.
Considering a transparent fiber, however, very near to 0, the interference effect between refracted and reflected light discussed in the previous section disappears. There is still refracted light passing through the fiber; however, at 0 = 0 there is no reflected light. The result is that the scattering pattern near 0 results from interference between the diffracted light and the refracted light. As the angle increases from zero, the pattern results from interfering diffracted, reflected, and refracted light. At progressively larger angles, the contribution from diffraction is reduced until at about 7 only the reflected light and refracted light interfere. The change at 7 is not a 1g)5'~4 constant, but varies with the size of the fiber under examination, and increases with smaller fiber diameters. I
have also discovered that the interference effects are de-pendent on both the diameter of the fiber and its refractive index. The diffraction effects, however, are only a function of the fiber dia~eter. Thus, if the refractive index of the fiber is known, by measuring the angle at which the diffraction contribution to the overall pattern disappears, and then com-paring this angle with the corresponding angle from a fiber of known diameter, one obtains yet another technique for measuring fiber diameter.
Fig. 10 shows the measured forward scattering pattern over the range +10 to -10 for a typical unclad fiber, for example, a 4Q~m quartz fiber. It will be seen that the pattern is not symmetrical about the zero axis and that the amplitude of corresponding maxima are different;
the effect being most noticeable at the lower scattering angles. As previously discussed, the explanation for this effect is believed to be the non-circularity of the fiber cross-section. Eccentricities of up to 0.5~m were measured in the experimental sample actually used to generate Fig. 10.
An explanation of this phenomenon is that the refracted rays for the two sides of the scattering pattern have a small difference in phase induced therein because of the non-circular cross-section This results in different amplitudes in the lobes of the forward angle where the interference between the refracted ray and the diffraction pattern occurs.
The technique for measuring fiber non-circularity, discussed above, utilizes to good advantage the asymmetrical nature of the scattering pattern but does not directly utilize the observed differences in corresponding fringe maxima.
105'~5tj4 The immediately preceding discussion, it will be recalled, dealt with scattering in the range ~= 0 to + 10.
Fig. 11, on the other hand, shows the theoretical scattered intensity (derived from wave theory) for a typical unclad quartz fiber of 35~m diameter for the scattering angle range of 140 - 175, that is to say, in a direction which is almost directly towards the source. It will be noted, that there is a definite cut-off in the scattered intensity at about 152.5, as predicted by geometric ray trace theory for parallel polarization. It was also found that this cut-off angle depends only on the refractive index of the fiber, in agreement with theory. It will be noted also that there is a fringe structure of sorts above 150, however, there is also a finer fringe structure superimposed thereon which makes these fringes indistinct. A proposal has been made to use these fringes as a method of measuring the fiber diameter. However, it is apparent from comparing these fringes with those obtained for the forward angle of between 10-90 that the forward scattering pattern is easier to measure and gives more accurate results.
Fig. 12 shows the experimental scattering pattern obtained from an unclad fiber using parallel polarization, over approximately the same scattering angle range used in Fig. 11. The fiber cross-section, however, was not perfectly circular and there was up to a-10 percent difference in ortho-gonally measured diameters of the sample. The cut-off effect is, nevertheless, quite evident; however, the cut-off angle differs by approximately 15 from that shown in Fig. 11 because of the non-circular cross-section of the fiber.
The fine fringe structure previously noted is 1~5;~ 4 present to some extent, although the magnitude is less than that predicted by theory.
So far we have been considering only unclad fibers, however, for optical communications purposes, clad fiber is preferred. As one would expect, the forward s~attering pattern which is obtained from a clad fiber can also be divided into two regions of interest, (a) 0-7, and (b) 10 to about 100.
These two regions will be discussed first and finally the backscattering region beyond approximately 100.
FIGS. 13, 14, and 15, respectively, show the calculated scattering patterns between 0-35, 35-70, and 70-105 for a typical clad quartz fiber having an outer diameter of 43.05~m.
The core diameter was 20~m and the four graphs within each figure represent different core indices for a fixed cladding index of 1.457. The bottom graph thus represents an unclad fiber for comparison purposes. The graphs shown are for incident beam polarization parallel to the fiber axis which is the preferred polarization. As can be seen, the most obvious effect of an increase in core index is the production of a modulation in intensity of the fringe pattern. This modulation is not perceptable with only a 0.001 index difference between the core and cladding but is definitely present with 0.01 index difference and is quite large with the 0.1 index difference.
One feature which can be seen in FIGS. 13, 14, and 15 is that the period of the modulation (as a function of scattering angle e) varies with the difference in index difference. In addition, further experiments have demonstrated that the angular position 0C of the beginning of modulation increases with increases in the core-to-fiber diameter ratio. These observations led me to conceive of a technique wherein the difference between the core and cladding indices could be measured for a fiber of known -~6~5'~S~4 geometry or, alternatively, how the ratio of the core~to-fiber diameter could be measured for a fiber of known compos~tion.
Or, if desired, both measurements could be made simultaneously.
In the first case, at a given scattering angle eR~ the periodicity and angular position of the modulation is measured over the angle range ~eR, where eR + 1/2 ~eR ~ eF. This periodicity and angular position is then compared to the periodicity and angular position of known fibers of comparable geometry, taken at the same scattering angle. This yields the numeric difference between core and cladding indices; hence, if either is known, the other can be readily calculated. On the other hand, if the indices of the core and cladding are known, but the fiber geometry is not, the valve of eC can be used to find the core-to-fiber diameter ratio. Then, if either the core size or overall fiber diameter is known, the other can be calculated. In FIG. 13, eC is shown to be about e = 33.
Perhaps, a more important characteristic is shown in FIG. 16. Here, the position of the fringe minima are plotted as a function of angle. Instead of starting at 0, however, the fringe count is started at about 80.2 for reasons which will become apparent. What happens is that the position of the fringe minima, and the number of fringes as a function of angle, is constant between about 40 and 80 regardless of variations in the core index. This effect can be derived from geometric ray theory, and is developed in a manner similar to the way the theory was developed for the unclad fiber.
In FIG, 17, a diagram of rays being refracted and reflected by a clad fiber is shown. It can be seen that rays can be refracted either by both the cladding and the core or by the cladding alone. It can also be seen that there is a `` 1C~5'~
range of scattering angles within which either type of refraction can produce the same scattering angle. The modulation described above occurs for scattering angles where both types of refraction occur. As indicated in FIG. 16, the number of fringes in angle ranges above eC is substantially independent of the refractive index of the core, thus implying that the light refracted by both cladding and core is less significant and that light refracted only by the cladding predominates in the angle range above eC
From FIG. 17, it can be seen that ~C' where modulatlon begins, is the scattering angle of a ray that ~ust grazes the core and that is refracted only by the cladding. For this ray sin ~C = alb (24) and from Snell's law sin C = ml sin ~C aml/b (25) where ml is the refractive index of the cladding. Since eC/2 = C ~ ~C (26) then ~c/2 = sin 1 (aml/b) - sin 1 (a/b) (27) which can be rewritten eC = 2[sin l (aml/b) - sin 1 (a/b)] (28) If eC can be measured the ratio a/b can be determined by rewriting equation (28) to put a/b in terms of ~C This can more easily be done by rewriting equation (25) as a/b = sin aC/ml (29) and substituting an expression trigonometrically relating C
to ec, which can be derived from equation (14), so that equation (29) becomes .
a/b = sin (ec/2)/ ~ml + 1 - 2ml cos (ec/2) (30) Thus, the ratio of core radius to cladding or fiber radius (which, of course, is the same as the ratio of core diameter ~052S~4 to cladding or fiber diameter) can be determined from ~C' and given one of these radii (or diameters) and cladding index ml, the other radius (or diameter) can be found.
For values of ~ above ~C' equation (21) may be used to calculate the fiber diameter since the rays become in-dependent of core parameters. As can be seen from Equation 28, this large angle region, where the scattering pattern fringe position is independent of core index (or size) only exists for medium and small core diameters. In fact, the diameter 0 ratio, a/b must be such that a/b < l/ml (31) for it to exist. For example, if the fiber has an index ml = 1.5, the core-to-fiber diameter ratio must be less than 0.67.
This result is very important because it means that for fibers with moderate core/cladding ratios, measurements of the scattering pattern fringe positions at large angles (between approximately 50-90) may be used to obtain the total fiber diameter, independent of the fiber core diameter and index, provided that the index of the cladding layer is known.
To measure the diameters of both the cladding and the core, then, given the refractive index of the cladding, the diameter of the cladding is first determined by counting fringes between el and e2 and using equation (21) with l > eC and e2 < OF; then the diameter of the core is found by measuring eC and using equation (30) and the already-determined diameter of the cladding.
In a system wherein a fiber is advanced as the scattering pattern is analyzed, a change in the outer diameter of the fiber will cause a movement of the fringes in the scattering pattern. Thus, the movement of a given number of ~05'~4 fringes past a reference point at a scattering angle eR during a given fiber advance can be related to a corresponding change in path-length difference. This latter change is equal to ~N where N is the number of fringes passing the reference point. From equation ~19), ad = NpA/ [sin (~R/2) + ~m + 1 - 2m cos (eR/2) ~ (32) where ~d is the change in fiber diameter during the given advance. Of course, eR must be less than eF, and for a clad fiber, eR must be greater than Hc.
FIG. 18 is an expansion of the lower ang~e portion of FIG. 16 and shows in greater detail the variation of fringe position with differing core indices. It will be recalled that the angle range shown in FIG. 18 is less than the critical angle ~C These graphs will also change with variations in core diameter. The results indicate that measurements which are made on the fringe positions at low diffraction angles will permit either the core diameter or core index ~o be found, knowing the other. This measurement technique appears most attractive for core/cladding index differences of greater than 0.01, and it will work with differences as high as 0.1 or more. As shown in FIG. 18, a quartz fiber having a 20~m core whose index was 0.01 greater than the cladding layer yielded one fringe difference at the 10 angle. Thus, the number of fringes must be measured to an accuracy of much less than one fringe in order to give accurate core diameter measuremehts, but this is no problem.
As in the case of the unclad fiber, geometric theory predicts a cut-off angle eF and its value may be obtained from Equation (23) if Equation (31) holds. As was the case for the unclad fiber, there is no threshold cut-off for the calculated ~ 26 -" 1~5i~5~4 patterns shown in FIG. 16 and so this cannot be used to measure fiber refractive index accurately.
Consider now forward scattering over the range = 0-7, which angle range is very similar to the 0-7 range used for the unclad fiber. The pattern observed is 105~5~4 the combined effect of the interference fringes from refracted and reflected light and the diffraction effects from light not intercepted by the fiber. At these low angles, rays transmitted through the fiber go through both core and cladding and so changes in both core and cladding parameters change the phase of this ray and, thus, the structure of the scattering pattern.
Figs. 19-22 show the best fit that was obtained between theory and experiment for a typical clad, glass fiber.~ The fiber was measured to have an outer diameter of 18.6 + 0.5 ~m using an image-splitting eyepiece. The core index at a wavelength of 0.633 ~m was 1.616 and the cladding index was 1.518. The core diameter was estimated to be about 15 ~m using a scanning electron microscope. The theoretical plots in Figs. 19-22 assumed a fiber having a diameter of 18.25 ~m and a core diameter of 13.8~ m.
Since the core diameter of this experimental sample was so large, there exists no angle where the fringes are independent of core diameter. However, Fig. 16 does show that the fringes are progressively less sensitive to core diameter at larger angles. Therefore, matching was obtained by a "zeroing-in" process wherein a best match was first obtained at the larger angles by varying the fiber diameter. Next, the core diameter was varied to obtain the best match between the small angle patterns, and this pro-cess was repeated until the best fit was achieved. It should be noted that the theoretical and experimental scattering intensities shown were normalized so that they were equal at the 13 maximum, for convenience in plotting.
In Figs. 19-22, the modulation of the intensities does not match very well at the larger angles, that is, iO5'~5~
larger than approximately 63. By changing the core diameter to 14.3 ~m and the fiber diameter to 18.3 ~m, Figs. 23-26 were obtained. Here, a much better match of the modulation intensities was obtained; however, the fringe positions do not agree quite so well, especially at the lower angles.
This would seem to indicate an incorrect core diame~er.
It is not known why a better match could not be obtained under these circumstances, but a reasonable explanation might be the existence of small deviations from circularity in the fiber cross section. Also, it was not known how concentric the core was in this experimental fiber. Variations of only 0.1 ~m in fiber cross section and O.S ~m in concentricity would give the observed variations. It was necessary to cal-culate patterns to a precision of 0.1 ~m or better in fiber diameter and 0.5 ~m in core diameter to obtain a good match.
This suggests that this kind of accuracy will be obtained by the fiber diameter measurement device to be described below, which device detects the scattering pattern fringe separations and positions.
Figs. 23-26 indicate that there is a reasonable agreement between experiment and theory at very large scattering angles, that is, angles greater than approximately 170, although not as good as was obtained at the lower angles. There were also more violent changes in structure between the theoretical plots of Figs. 19-22, and Figs. 23-26, although Figs. 19-22 seem to match the experimental data more closely.
Fig. 27 is the theoretical scattering pattern for the same 43.05 ~m fiber discussed earlier but plotted for 30 scattering angles of 145 through 180. The same four values of core index were used, namely, 1.457, 1.458, 1.467, ~ lOSZ5~
and 1.557 witll a 20 ~m diameter core. The cladding index was 1.457 so the bottom curve is for an unclad fiber. There were differences found in the structure of the patterns although there is the same cut-off edge at an angle of 151, in all cases. There were changes evident even for a 0.001 index difference between core and cladding, showing that this part of the scattering pattern is more sensitive from 115 to 180, than at the smaller scattering angles. The changes are greater, nearer to a 180 scattering angle~
than at angles close to 150.
Fig. 28 depicts an illustrative apparatus which may be used to perform the measurements on fringe position and amplitude according to the invention. As shown, the fiber 10 to be measured is secured in some suitable holder 11 which is fastened to a spectrometer base 12. A rotatable table 13, coaxial with fiber 10 and base 12, mounts a spectrometer 16 having a slit detector 17 at one end thereof.
A radiant energy source 18, for example, a C.W. HeNe laser, directs a light beam 19 at the fiber 10.
The output of the laser is chopped by a rotary chopper 21, as shown.
A synchronous motor 22 drives a wheel 23 which engages the rotatable table 13. A control circuit 24 drives motor 22 and receives the output of a lock-in amplifier 26 which in turn receives the output of slit detector 17 and also drives chopper 21. A pen recorder 27, or other suitable recording device, is also connected to the output of amplifier 26.
In operation, the laser 19 is energized by 30 control circuit 24 and spectrometer 16 rotated to the 0 105;~5~4 position. Next, motor Z2 is energized to slowly rotate table - 13 so that detector 17 views the entlre scattering pattern after one complete revolution (360) has been accomplished. The output of detector 17, synchronized with chopper 2I, is displayed on recorder 27 and the recorder trace, of course, contains the amplitude and spatial information required to perform the methods of this invention.
- If only a limited range of angles need be swept, control circuit 24 can be preset to start and to terminate the rotation of table 13 at the desired angles. Or, if measurements only at a particular angle are required, detector 17 can be fixed.
In an on-line process, the output of amplifier 26 would be connected to suitable logic circuitry such that if the parameter being measured, for example fiber diameter, exceeded or fell below some priorly established tolerance limit, a feedback loop could make appropriate changes to the process. Thus, fiber diameter, or any other important parameter, could be maintained to an extremely fine tolerance. In this latter event, a rotating spectrometer would probably be inconvenient so, as shown in FIG. 29, a circular array of photoelectric devices 30, for example photodiodes, and a scanner 31 would be substituted for spectrometer 16, motor 22, etc., in FIG. 1.
The preferred radiant energy source is, of course, a laser. However, other monochromatic, coherent sources, such as a pinhole and a mercury vapor lamp, may also be employed.
One skilled in the art may make various changes and substitutions to the arrangement of parts shown without departing from the spirit and scope of the invention.
As previously mentioned, discrepancies between the theoretical and the experimental patterns in Fig. 5 were noted. It is believed that these are most probably due to the particular fused silica fiber sample which was employed for the experiment, which upon later examination, was found not to be perfectly circular in cross-section. The effect of this non-circularity is to give a variation in intensity of the maxima and also to give small deviations of the fringe position with respect to angle. This observation suggested to me a `` 1~5~St~4 technique for measuring fiber non-circularity. For example, at the given reference angles, +~R and -~R~ one compares the fringe patterns present in the angle range ~R. If the fiber is non-circular, bdth fringe patterns will be offset to the right (or left). That is to say, one fringe pattern will be closer to the origin (~=0) than theory predicts, while the other pattern will be correspondingly further away from the origin. The degree of relative pattern shift is, of course, proportional to the fiber non-circularity, and if the system is calibrated with fibers of known eccentricity, the non-circularity of an unknown fiber may readily be ascertained.
For fibers with larger eccentricities, fringe counts on each side of the fiber can also be made.
As discussed, Fig. 7 is a comparison of theory and experiment for the scattered intensity over the angle range 35 - 70 for the same fiber used in Fig. 5, again for the case of parallel polarization. The same discrepancies which were noted in Fig. 5 between theory and experiment were found in Fig. 7 and are also believed to be due to the elliptical, non-circular fiber cross-section. However, this latter plot demonstrates the high contrast fringes which may be obtained. Calculations also show that the maxima and minima positions predicted by Equation (18) are correct over the angle range from ~7 to QF.
Fig. 8 shows the theoretical plot for the case of incident light polarized perpendicular to the fiber axis.
The same fringes are present; however, the contrast is considerably less and even approaches zero at one angle.
This lower fringe contrast was confirmed in the 16~5;Z5t~4 experimentally derived scattering patterns. Thus, although perpendicular polarization may be used in any of the measurement techniques disclosed herein, because of the low-fringe contrast which makes accurate measurements difficult, the preferred polarization is parallel to the fiber axis.
For the region ~ = 0 to ~ = 7, there is yet ano~her effect which superimposes itself on the interference effects discussed above, that is, the diffraction of light which is not intercepted by the fiber. If the fiber were opaque then the diffraction pattern in the far field would have an intensity distribution as shown in FIG. 9. This is, of course, the classic sin distribution caused by the bending of the light transmitted at the edge of the opaque object by virtue of the wave properties of light, and is the basis of the prior art opaque filament measuring techniques discussed in the introduction.
Considering a transparent fiber, however, very near to 0, the interference effect between refracted and reflected light discussed in the previous section disappears. There is still refracted light passing through the fiber; however, at 0 = 0 there is no reflected light. The result is that the scattering pattern near 0 results from interference between the diffracted light and the refracted light. As the angle increases from zero, the pattern results from interfering diffracted, reflected, and refracted light. At progressively larger angles, the contribution from diffraction is reduced until at about 7 only the reflected light and refracted light interfere. The change at 7 is not a 1g)5'~4 constant, but varies with the size of the fiber under examination, and increases with smaller fiber diameters. I
have also discovered that the interference effects are de-pendent on both the diameter of the fiber and its refractive index. The diffraction effects, however, are only a function of the fiber dia~eter. Thus, if the refractive index of the fiber is known, by measuring the angle at which the diffraction contribution to the overall pattern disappears, and then com-paring this angle with the corresponding angle from a fiber of known diameter, one obtains yet another technique for measuring fiber diameter.
Fig. 10 shows the measured forward scattering pattern over the range +10 to -10 for a typical unclad fiber, for example, a 4Q~m quartz fiber. It will be seen that the pattern is not symmetrical about the zero axis and that the amplitude of corresponding maxima are different;
the effect being most noticeable at the lower scattering angles. As previously discussed, the explanation for this effect is believed to be the non-circularity of the fiber cross-section. Eccentricities of up to 0.5~m were measured in the experimental sample actually used to generate Fig. 10.
An explanation of this phenomenon is that the refracted rays for the two sides of the scattering pattern have a small difference in phase induced therein because of the non-circular cross-section This results in different amplitudes in the lobes of the forward angle where the interference between the refracted ray and the diffraction pattern occurs.
The technique for measuring fiber non-circularity, discussed above, utilizes to good advantage the asymmetrical nature of the scattering pattern but does not directly utilize the observed differences in corresponding fringe maxima.
105'~5tj4 The immediately preceding discussion, it will be recalled, dealt with scattering in the range ~= 0 to + 10.
Fig. 11, on the other hand, shows the theoretical scattered intensity (derived from wave theory) for a typical unclad quartz fiber of 35~m diameter for the scattering angle range of 140 - 175, that is to say, in a direction which is almost directly towards the source. It will be noted, that there is a definite cut-off in the scattered intensity at about 152.5, as predicted by geometric ray trace theory for parallel polarization. It was also found that this cut-off angle depends only on the refractive index of the fiber, in agreement with theory. It will be noted also that there is a fringe structure of sorts above 150, however, there is also a finer fringe structure superimposed thereon which makes these fringes indistinct. A proposal has been made to use these fringes as a method of measuring the fiber diameter. However, it is apparent from comparing these fringes with those obtained for the forward angle of between 10-90 that the forward scattering pattern is easier to measure and gives more accurate results.
Fig. 12 shows the experimental scattering pattern obtained from an unclad fiber using parallel polarization, over approximately the same scattering angle range used in Fig. 11. The fiber cross-section, however, was not perfectly circular and there was up to a-10 percent difference in ortho-gonally measured diameters of the sample. The cut-off effect is, nevertheless, quite evident; however, the cut-off angle differs by approximately 15 from that shown in Fig. 11 because of the non-circular cross-section of the fiber.
The fine fringe structure previously noted is 1~5;~ 4 present to some extent, although the magnitude is less than that predicted by theory.
So far we have been considering only unclad fibers, however, for optical communications purposes, clad fiber is preferred. As one would expect, the forward s~attering pattern which is obtained from a clad fiber can also be divided into two regions of interest, (a) 0-7, and (b) 10 to about 100.
These two regions will be discussed first and finally the backscattering region beyond approximately 100.
FIGS. 13, 14, and 15, respectively, show the calculated scattering patterns between 0-35, 35-70, and 70-105 for a typical clad quartz fiber having an outer diameter of 43.05~m.
The core diameter was 20~m and the four graphs within each figure represent different core indices for a fixed cladding index of 1.457. The bottom graph thus represents an unclad fiber for comparison purposes. The graphs shown are for incident beam polarization parallel to the fiber axis which is the preferred polarization. As can be seen, the most obvious effect of an increase in core index is the production of a modulation in intensity of the fringe pattern. This modulation is not perceptable with only a 0.001 index difference between the core and cladding but is definitely present with 0.01 index difference and is quite large with the 0.1 index difference.
One feature which can be seen in FIGS. 13, 14, and 15 is that the period of the modulation (as a function of scattering angle e) varies with the difference in index difference. In addition, further experiments have demonstrated that the angular position 0C of the beginning of modulation increases with increases in the core-to-fiber diameter ratio. These observations led me to conceive of a technique wherein the difference between the core and cladding indices could be measured for a fiber of known -~6~5'~S~4 geometry or, alternatively, how the ratio of the core~to-fiber diameter could be measured for a fiber of known compos~tion.
Or, if desired, both measurements could be made simultaneously.
In the first case, at a given scattering angle eR~ the periodicity and angular position of the modulation is measured over the angle range ~eR, where eR + 1/2 ~eR ~ eF. This periodicity and angular position is then compared to the periodicity and angular position of known fibers of comparable geometry, taken at the same scattering angle. This yields the numeric difference between core and cladding indices; hence, if either is known, the other can be readily calculated. On the other hand, if the indices of the core and cladding are known, but the fiber geometry is not, the valve of eC can be used to find the core-to-fiber diameter ratio. Then, if either the core size or overall fiber diameter is known, the other can be calculated. In FIG. 13, eC is shown to be about e = 33.
Perhaps, a more important characteristic is shown in FIG. 16. Here, the position of the fringe minima are plotted as a function of angle. Instead of starting at 0, however, the fringe count is started at about 80.2 for reasons which will become apparent. What happens is that the position of the fringe minima, and the number of fringes as a function of angle, is constant between about 40 and 80 regardless of variations in the core index. This effect can be derived from geometric ray theory, and is developed in a manner similar to the way the theory was developed for the unclad fiber.
In FIG, 17, a diagram of rays being refracted and reflected by a clad fiber is shown. It can be seen that rays can be refracted either by both the cladding and the core or by the cladding alone. It can also be seen that there is a `` 1C~5'~
range of scattering angles within which either type of refraction can produce the same scattering angle. The modulation described above occurs for scattering angles where both types of refraction occur. As indicated in FIG. 16, the number of fringes in angle ranges above eC is substantially independent of the refractive index of the core, thus implying that the light refracted by both cladding and core is less significant and that light refracted only by the cladding predominates in the angle range above eC
From FIG. 17, it can be seen that ~C' where modulatlon begins, is the scattering angle of a ray that ~ust grazes the core and that is refracted only by the cladding. For this ray sin ~C = alb (24) and from Snell's law sin C = ml sin ~C aml/b (25) where ml is the refractive index of the cladding. Since eC/2 = C ~ ~C (26) then ~c/2 = sin 1 (aml/b) - sin 1 (a/b) (27) which can be rewritten eC = 2[sin l (aml/b) - sin 1 (a/b)] (28) If eC can be measured the ratio a/b can be determined by rewriting equation (28) to put a/b in terms of ~C This can more easily be done by rewriting equation (25) as a/b = sin aC/ml (29) and substituting an expression trigonometrically relating C
to ec, which can be derived from equation (14), so that equation (29) becomes .
a/b = sin (ec/2)/ ~ml + 1 - 2ml cos (ec/2) (30) Thus, the ratio of core radius to cladding or fiber radius (which, of course, is the same as the ratio of core diameter ~052S~4 to cladding or fiber diameter) can be determined from ~C' and given one of these radii (or diameters) and cladding index ml, the other radius (or diameter) can be found.
For values of ~ above ~C' equation (21) may be used to calculate the fiber diameter since the rays become in-dependent of core parameters. As can be seen from Equation 28, this large angle region, where the scattering pattern fringe position is independent of core index (or size) only exists for medium and small core diameters. In fact, the diameter 0 ratio, a/b must be such that a/b < l/ml (31) for it to exist. For example, if the fiber has an index ml = 1.5, the core-to-fiber diameter ratio must be less than 0.67.
This result is very important because it means that for fibers with moderate core/cladding ratios, measurements of the scattering pattern fringe positions at large angles (between approximately 50-90) may be used to obtain the total fiber diameter, independent of the fiber core diameter and index, provided that the index of the cladding layer is known.
To measure the diameters of both the cladding and the core, then, given the refractive index of the cladding, the diameter of the cladding is first determined by counting fringes between el and e2 and using equation (21) with l > eC and e2 < OF; then the diameter of the core is found by measuring eC and using equation (30) and the already-determined diameter of the cladding.
In a system wherein a fiber is advanced as the scattering pattern is analyzed, a change in the outer diameter of the fiber will cause a movement of the fringes in the scattering pattern. Thus, the movement of a given number of ~05'~4 fringes past a reference point at a scattering angle eR during a given fiber advance can be related to a corresponding change in path-length difference. This latter change is equal to ~N where N is the number of fringes passing the reference point. From equation ~19), ad = NpA/ [sin (~R/2) + ~m + 1 - 2m cos (eR/2) ~ (32) where ~d is the change in fiber diameter during the given advance. Of course, eR must be less than eF, and for a clad fiber, eR must be greater than Hc.
FIG. 18 is an expansion of the lower ang~e portion of FIG. 16 and shows in greater detail the variation of fringe position with differing core indices. It will be recalled that the angle range shown in FIG. 18 is less than the critical angle ~C These graphs will also change with variations in core diameter. The results indicate that measurements which are made on the fringe positions at low diffraction angles will permit either the core diameter or core index ~o be found, knowing the other. This measurement technique appears most attractive for core/cladding index differences of greater than 0.01, and it will work with differences as high as 0.1 or more. As shown in FIG. 18, a quartz fiber having a 20~m core whose index was 0.01 greater than the cladding layer yielded one fringe difference at the 10 angle. Thus, the number of fringes must be measured to an accuracy of much less than one fringe in order to give accurate core diameter measuremehts, but this is no problem.
As in the case of the unclad fiber, geometric theory predicts a cut-off angle eF and its value may be obtained from Equation (23) if Equation (31) holds. As was the case for the unclad fiber, there is no threshold cut-off for the calculated ~ 26 -" 1~5i~5~4 patterns shown in FIG. 16 and so this cannot be used to measure fiber refractive index accurately.
Consider now forward scattering over the range = 0-7, which angle range is very similar to the 0-7 range used for the unclad fiber. The pattern observed is 105~5~4 the combined effect of the interference fringes from refracted and reflected light and the diffraction effects from light not intercepted by the fiber. At these low angles, rays transmitted through the fiber go through both core and cladding and so changes in both core and cladding parameters change the phase of this ray and, thus, the structure of the scattering pattern.
Figs. 19-22 show the best fit that was obtained between theory and experiment for a typical clad, glass fiber.~ The fiber was measured to have an outer diameter of 18.6 + 0.5 ~m using an image-splitting eyepiece. The core index at a wavelength of 0.633 ~m was 1.616 and the cladding index was 1.518. The core diameter was estimated to be about 15 ~m using a scanning electron microscope. The theoretical plots in Figs. 19-22 assumed a fiber having a diameter of 18.25 ~m and a core diameter of 13.8~ m.
Since the core diameter of this experimental sample was so large, there exists no angle where the fringes are independent of core diameter. However, Fig. 16 does show that the fringes are progressively less sensitive to core diameter at larger angles. Therefore, matching was obtained by a "zeroing-in" process wherein a best match was first obtained at the larger angles by varying the fiber diameter. Next, the core diameter was varied to obtain the best match between the small angle patterns, and this pro-cess was repeated until the best fit was achieved. It should be noted that the theoretical and experimental scattering intensities shown were normalized so that they were equal at the 13 maximum, for convenience in plotting.
In Figs. 19-22, the modulation of the intensities does not match very well at the larger angles, that is, iO5'~5~
larger than approximately 63. By changing the core diameter to 14.3 ~m and the fiber diameter to 18.3 ~m, Figs. 23-26 were obtained. Here, a much better match of the modulation intensities was obtained; however, the fringe positions do not agree quite so well, especially at the lower angles.
This would seem to indicate an incorrect core diame~er.
It is not known why a better match could not be obtained under these circumstances, but a reasonable explanation might be the existence of small deviations from circularity in the fiber cross section. Also, it was not known how concentric the core was in this experimental fiber. Variations of only 0.1 ~m in fiber cross section and O.S ~m in concentricity would give the observed variations. It was necessary to cal-culate patterns to a precision of 0.1 ~m or better in fiber diameter and 0.5 ~m in core diameter to obtain a good match.
This suggests that this kind of accuracy will be obtained by the fiber diameter measurement device to be described below, which device detects the scattering pattern fringe separations and positions.
Figs. 23-26 indicate that there is a reasonable agreement between experiment and theory at very large scattering angles, that is, angles greater than approximately 170, although not as good as was obtained at the lower angles. There were also more violent changes in structure between the theoretical plots of Figs. 19-22, and Figs. 23-26, although Figs. 19-22 seem to match the experimental data more closely.
Fig. 27 is the theoretical scattering pattern for the same 43.05 ~m fiber discussed earlier but plotted for 30 scattering angles of 145 through 180. The same four values of core index were used, namely, 1.457, 1.458, 1.467, ~ lOSZ5~
and 1.557 witll a 20 ~m diameter core. The cladding index was 1.457 so the bottom curve is for an unclad fiber. There were differences found in the structure of the patterns although there is the same cut-off edge at an angle of 151, in all cases. There were changes evident even for a 0.001 index difference between core and cladding, showing that this part of the scattering pattern is more sensitive from 115 to 180, than at the smaller scattering angles. The changes are greater, nearer to a 180 scattering angle~
than at angles close to 150.
Fig. 28 depicts an illustrative apparatus which may be used to perform the measurements on fringe position and amplitude according to the invention. As shown, the fiber 10 to be measured is secured in some suitable holder 11 which is fastened to a spectrometer base 12. A rotatable table 13, coaxial with fiber 10 and base 12, mounts a spectrometer 16 having a slit detector 17 at one end thereof.
A radiant energy source 18, for example, a C.W. HeNe laser, directs a light beam 19 at the fiber 10.
The output of the laser is chopped by a rotary chopper 21, as shown.
A synchronous motor 22 drives a wheel 23 which engages the rotatable table 13. A control circuit 24 drives motor 22 and receives the output of a lock-in amplifier 26 which in turn receives the output of slit detector 17 and also drives chopper 21. A pen recorder 27, or other suitable recording device, is also connected to the output of amplifier 26.
In operation, the laser 19 is energized by 30 control circuit 24 and spectrometer 16 rotated to the 0 105;~5~4 position. Next, motor Z2 is energized to slowly rotate table - 13 so that detector 17 views the entlre scattering pattern after one complete revolution (360) has been accomplished. The output of detector 17, synchronized with chopper 2I, is displayed on recorder 27 and the recorder trace, of course, contains the amplitude and spatial information required to perform the methods of this invention.
- If only a limited range of angles need be swept, control circuit 24 can be preset to start and to terminate the rotation of table 13 at the desired angles. Or, if measurements only at a particular angle are required, detector 17 can be fixed.
In an on-line process, the output of amplifier 26 would be connected to suitable logic circuitry such that if the parameter being measured, for example fiber diameter, exceeded or fell below some priorly established tolerance limit, a feedback loop could make appropriate changes to the process. Thus, fiber diameter, or any other important parameter, could be maintained to an extremely fine tolerance. In this latter event, a rotating spectrometer would probably be inconvenient so, as shown in FIG. 29, a circular array of photoelectric devices 30, for example photodiodes, and a scanner 31 would be substituted for spectrometer 16, motor 22, etc., in FIG. 1.
The preferred radiant energy source is, of course, a laser. However, other monochromatic, coherent sources, such as a pinhole and a mercury vapor lamp, may also be employed.
One skilled in the art may make various changes and substitutions to the arrangement of parts shown without departing from the spirit and scope of the invention.
Claims (3)
1. A method of measuring the diameter, DC, of the core of a clad optical fiber, given the thickness of the cladding layer, t, and the refractive indices of the cladding and core, m1 and m2, respectively, which comprises:
directing a beam of spatially coherent, monochromatic radiation at said fiber thereby to generate a complex scattering pattern, at least a portion of said pattern including contributions from the diffraction, the reflection and the refraction of said beam by said fiber, said scattering pattern being spatially radially disposed about said fiber and having a fringe pattern intensity modulation super-imposed thereon;
at a given reference angle .THETA.R, measuring the modulation pattern over an angle range .DELTA..THETA.R, where .THETA.R satisfies the relationship:
.THETA.R + 1/2.DELTA..THETA.R < .THETA.F
and .THETA.F is the cut-off angle which satisfies the relation:
m1 cos (.THETA.F/2) = 1;
determining the core-to-fiber diameter ratio, R, by comparing said measured modulation pattern with modulation patterns priorly observed for clad optical fibers of the same core and cladding indices, measured at the same scattering angle range .DELTA..THETA.R; and then computing said core diameter DC from the equation:
DC = 2Rt/(1- R).
directing a beam of spatially coherent, monochromatic radiation at said fiber thereby to generate a complex scattering pattern, at least a portion of said pattern including contributions from the diffraction, the reflection and the refraction of said beam by said fiber, said scattering pattern being spatially radially disposed about said fiber and having a fringe pattern intensity modulation super-imposed thereon;
at a given reference angle .THETA.R, measuring the modulation pattern over an angle range .DELTA..THETA.R, where .THETA.R satisfies the relationship:
.THETA.R + 1/2.DELTA..THETA.R < .THETA.F
and .THETA.F is the cut-off angle which satisfies the relation:
m1 cos (.THETA.F/2) = 1;
determining the core-to-fiber diameter ratio, R, by comparing said measured modulation pattern with modulation patterns priorly observed for clad optical fibers of the same core and cladding indices, measured at the same scattering angle range .DELTA..THETA.R; and then computing said core diameter DC from the equation:
DC = 2Rt/(1- R).
2. The method according to claim 1 wherein said beam directing step comprises:
positioning a beam of spatially coherent, monochromatic radiation to impinge upon said filament perpendicular to the longitudinal axis thereof, said beam having an electric field vector which is parallel to said axis.
positioning a beam of spatially coherent, monochromatic radiation to impinge upon said filament perpendicular to the longitudinal axis thereof, said beam having an electric field vector which is parallel to said axis.
3. The method according to claim 1 wherein said beam directing step comprises:
positioning a beam of spatially coherent, monochromatic radiation to impinge upon said filament perpendicular to the longitudinal axis thereof, said beam having an electric field vector which is transverse to said axis.
positioning a beam of spatially coherent, monochromatic radiation to impinge upon said filament perpendicular to the longitudinal axis thereof, said beam having an electric field vector which is transverse to said axis.
Priority Applications (3)
| Application Number | Priority Date | Filing Date | Title |
|---|---|---|---|
| CA297,923A CA1052564A (en) | 1974-06-21 | 1978-02-28 | Method for measuring the parameters of optical fibers |
| CA314,820A CA1068099A (en) | 1974-06-21 | 1978-10-30 | Method of measuring the parameters of optical fibers |
| CA314,818A CA1054361A (en) | 1974-06-21 | 1978-10-30 | Method of measuring the parameters of optical fibers |
Applications Claiming Priority (2)
| Application Number | Priority Date | Filing Date | Title |
|---|---|---|---|
| US05/482,707 US3982816A (en) | 1974-06-21 | 1974-06-21 | Method for measuring the parameters of optical fibers |
| CA297,923A CA1052564A (en) | 1974-06-21 | 1978-02-28 | Method for measuring the parameters of optical fibers |
Publications (1)
| Publication Number | Publication Date |
|---|---|
| CA1052564A true CA1052564A (en) | 1979-04-17 |
Family
ID=25668658
Family Applications (2)
| Application Number | Title | Priority Date | Filing Date |
|---|---|---|---|
| CA297,923A Expired CA1052564A (en) | 1974-06-21 | 1978-02-28 | Method for measuring the parameters of optical fibers |
| CA314,818A Expired CA1054361A (en) | 1974-06-21 | 1978-10-30 | Method of measuring the parameters of optical fibers |
Family Applications After (1)
| Application Number | Title | Priority Date | Filing Date |
|---|---|---|---|
| CA314,818A Expired CA1054361A (en) | 1974-06-21 | 1978-10-30 | Method of measuring the parameters of optical fibers |
Country Status (1)
| Country | Link |
|---|---|
| CA (2) | CA1052564A (en) |
-
1978
- 1978-02-28 CA CA297,923A patent/CA1052564A/en not_active Expired
- 1978-10-30 CA CA314,818A patent/CA1054361A/en not_active Expired
Also Published As
| Publication number | Publication date |
|---|---|
| CA1054361A (en) | 1979-05-15 |
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