JP6876834B2 - 新無線のためのldpcシフト係数 - Google Patents
新無線のためのldpcシフト係数 Download PDFInfo
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- 239000011159 matrix material Substances 0.000 claims description 149
- 238000000034 method Methods 0.000 claims description 55
- 239000013598 vector Substances 0.000 claims description 50
- 238000012545 processing Methods 0.000 claims description 37
- 238000004891 communication Methods 0.000 claims description 19
- 125000004122 cyclic group Chemical group 0.000 claims description 16
- 238000001514 detection method Methods 0.000 description 19
- 238000013461 design Methods 0.000 description 18
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- 238000007792 addition Methods 0.000 description 3
- 238000004590 computer program Methods 0.000 description 3
- 238000005457 optimization Methods 0.000 description 3
- WHXSMMKQMYFTQS-UHFFFAOYSA-N Lithium Chemical compound [Li] WHXSMMKQMYFTQS-UHFFFAOYSA-N 0.000 description 2
- 229910052744 lithium Inorganic materials 0.000 description 2
- 230000007774 longterm Effects 0.000 description 2
- 230000000750 progressive effect Effects 0.000 description 2
- HBBGRARXTFLTSG-UHFFFAOYSA-N Lithium ion Chemical compound [Li+] HBBGRARXTFLTSG-UHFFFAOYSA-N 0.000 description 1
- OJIJEKBXJYRIBZ-UHFFFAOYSA-N cadmium nickel Chemical compound [Ni].[Cd] OJIJEKBXJYRIBZ-UHFFFAOYSA-N 0.000 description 1
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- 229910001416 lithium ion Inorganic materials 0.000 description 1
- 229910052987 metal hydride Inorganic materials 0.000 description 1
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- 229910052759 nickel Inorganic materials 0.000 description 1
- PXHVJJICTQNCMI-UHFFFAOYSA-N nickel Substances [Ni] PXHVJJICTQNCMI-UHFFFAOYSA-N 0.000 description 1
- -1 nickel metal hydride Chemical class 0.000 description 1
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- 238000002135 phase contrast microscopy Methods 0.000 description 1
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- H03M13/05—Error detection or forward error correction by redundancy in data representation, i.e. code words containing more digits than the source words using block codes, i.e. a predetermined number of check bits joined to a predetermined number of information bits
- H03M13/11—Error detection or forward error correction by redundancy in data representation, i.e. code words containing more digits than the source words using block codes, i.e. a predetermined number of check bits joined to a predetermined number of information bits using multiple parity bits
- H03M13/1102—Codes on graphs and decoding on graphs, e.g. low-density parity check [LDPC] codes
- H03M13/1148—Structural properties of the code parity-check or generator matrix
- H03M13/116—Quasi-cyclic LDPC [QC-LDPC] codes, i.e. the parity-check matrix being composed of permutation or circulant sub-matrices
- H03M13/1168—Quasi-cyclic LDPC [QC-LDPC] codes, i.e. the parity-check matrix being composed of permutation or circulant sub-matrices wherein the sub-matrices have column and row weights greater than one, e.g. multi-diagonal sub-matrices
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- H03M13/03—Error detection or forward error correction by redundancy in data representation, i.e. code words containing more digits than the source words
- H03M13/05—Error detection or forward error correction by redundancy in data representation, i.e. code words containing more digits than the source words using block codes, i.e. a predetermined number of check bits joined to a predetermined number of information bits
- H03M13/11—Error detection or forward error correction by redundancy in data representation, i.e. code words containing more digits than the source words using block codes, i.e. a predetermined number of check bits joined to a predetermined number of information bits using multiple parity bits
- H03M13/1102—Codes on graphs and decoding on graphs, e.g. low-density parity check [LDPC] codes
- H03M13/1148—Structural properties of the code parity-check or generator matrix
- H03M13/116—Quasi-cyclic LDPC [QC-LDPC] codes, i.e. the parity-check matrix being composed of permutation or circulant sub-matrices
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- H03M13/03—Error detection or forward error correction by redundancy in data representation, i.e. code words containing more digits than the source words
- H03M13/033—Theoretical methods to calculate these checking codes
- H03M13/036—Heuristic code construction methods, i.e. code construction or code search based on using trial-and-error
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- H03M13/00—Coding, decoding or code conversion, for error detection or error correction; Coding theory basic assumptions; Coding bounds; Error probability evaluation methods; Channel models; Simulation or testing of codes
- H03M13/03—Error detection or forward error correction by redundancy in data representation, i.e. code words containing more digits than the source words
- H03M13/05—Error detection or forward error correction by redundancy in data representation, i.e. code words containing more digits than the source words using block codes, i.e. a predetermined number of check bits joined to a predetermined number of information bits
- H03M13/13—Linear codes
- H03M13/15—Cyclic codes, i.e. cyclic shifts of codewords produce other codewords, e.g. codes defined by a generator polynomial, Bose-Chaudhuri-Hocquenghem [BCH] codes
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- H04L—TRANSMISSION OF DIGITAL INFORMATION, e.g. TELEGRAPHIC COMMUNICATION
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- H04L1/0045—Arrangements at the receiver end
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- H—ELECTRICITY
- H04—ELECTRIC COMMUNICATION TECHNIQUE
- H04L—TRANSMISSION OF DIGITAL INFORMATION, e.g. TELEGRAPHIC COMMUNICATION
- H04L1/00—Arrangements for detecting or preventing errors in the information received
- H04L1/004—Arrangements for detecting or preventing errors in the information received by using forward error control
- H04L1/0045—Arrangements at the receiver end
- H04L1/0047—Decoding adapted to other signal detection operation
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- H—ELECTRICITY
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Description
符号化率互換性を有する低密度パリティ検査(LDPC)符号は、インクリメンタルリダンダンシー(増分冗長性)を有するハイブリッド自動再送要求(HARQ)の再送信を実現にするため、移動通信にとって重要である。また、特定の符号は、擬似巡回的であり、これは、簡単な符号化および復号化を保証する。擬似巡回パリティ検査行列は、サイズZ × Zの正方形サブブロック(部分行列)に分割され、単位行列の巡回置換またはヌル部分行列のいずれかである。巡回置換行列Pkは、Z × Z単位行列から、列をk個の成分だけ右に巡回シフトすることによって得られる。行列P0は、Z × Z単位行列である。
長さが2dサイクルであるACEは、次のように定義される。
スパース(疎)記述で指定されていない基本行列内のすべての成分は0である。スパースフォーマットは、シフト係数設計を導出するための元になる行列をコンパクトに記述する。
これは、Vi,jと、Zと、ZのセットとからPi,jを決定するための公式とともに、PCMを完全に指定する。
(1, 1, 1) (2, 1, 2) (3, 1, 3) (4, 1, 4) (5, 1, 6) (6, 1, 7)
(7, 1, 10) (8, 1, 11) (9, 1, 12) (10, 1, 13) (11, 1, 14) (12, 1, 16) (13, 1, 17)
(14, 1, 19) (15, 1, 20) (16, 1, 21) (17, 1, 22) (18, 1, 23) (19, 1, 24) (20, 2, 1)
(21, 2, 3) (22, 2, 4) (23, 2, 5) (24, 2, 6) (25, 2, 8) (26, 2, 9) (27, 2, 10)
(28, 2, 12) (29, 2, 13) (30, 2, 15) (31, 2, 16) (32, 2, 17) (33, 2, 18) (34, 2, 20)
(35, 2, 22) (36, 2, 23) (37, 2, 24) (38, 2, 25) (39, 3, 1) (40, 3, 2) (41, 3, 3)
(42, 3, 5) (43, 3, 6) (44, 3, 7) (45, 3, 8) (46, 3, 9) (47, 3, 10) (48, 3, 11)
(49, 3, 14) (50, 3, 15) (51, 3, 16) (52, 3, 18) (53, 3, 19) (54, 3, 20) (55, 3, 21)
(56, 3, 25) (57, 3, 26) (58, 4, 1) (59, 4, 2) (60, 4, 4) (61, 4, 5) (62, 4, 7)
(63, 4, 8) (64, 4, 9) (65, 4, 11) (66, 4, 12) (67, 4, 13) (68, 4, 14) (69, 4, 15)
(70, 4, 17) (71, 4, 18) (72, 4, 19) (73, 4, 21) (74, 4, 22) (75, 4, 23) (76, 4, 26)
(77, 5, 1) (78, 5, 2) (79, 5, 27) (80, 6, 1) (81, 6, 2) (82, 6, 4) (83, 6, 13)
(84, 6, 17) (85, 6, 22) (86, 6, 23) (87, 6, 28) (88, 7, 1) (89, 7, 7) (90, 7, 11)
(91, 7, 12) (92, 7, 14) (93, 7, 18) (94, 7, 19) (95, 7, 21) (96, 7, 29) (97, 8, 1)
(98, 8, 2) (99, 8, 5) (100, 8, 8) (101, 8, 9) (102, 8, 15) (103, 8, 30) (104, 9, 1)
(105, 9, 2) (106, 9, 4) (107, 9, 13) (108, 9, 17) (109, 9, 20) (110, 9, 22) (111, 9, 23)
(112, 9, 25) (113, 9, 31) (114, 10, 1) (115, 10, 2) (116, 10, 11) (117, 10, 12) (118, 10, 14)
(119, 10, 18) (120, 10, 19) (121, 10, 21) (122, 10, 32) (123, 11, 2) (124, 11, 3) (125, 11, 5)
(126, 11, 8) (127, 11, 9) (128, 11, 15) (129, 11, 33) (130, 12, 1) (131, 12, 2) (132, 12, 13)
(133, 12, 17) (134, 12, 22) (135, 12, 23) (136, 12, 24) (137, 12, 34) (138, 13, 1) (139, 13, 2)
(140, 13, 11) (141, 13, 12) (142, 13, 14) (143, 13, 19) (144, 13, 35) (145, 14, 1) (146, 14, 4)
(147, 14, 8) (148, 14, 21) (149, 14, 24) (150, 14, 36) (151, 15, 1) (152, 15, 13) (153, 15, 16)
(154, 15, 17) (155, 15, 18) (156, 15, 22) (157, 15, 37) (158, 16, 1) (159, 16, 2) (160, 16, 11)
(161, 16, 14) (162, 16, 19) (163, 16, 26) (164, 16, 38) (165, 17, 2) (166, 17, 4) (167, 17, 12)
(168, 17, 21) (169, 17, 23) (170, 17, 39) (171, 18, 1) (172, 18, 15) (173, 18, 17) (174, 18, 18)
(175, 18, 22) (176, 18, 40) (177, 19, 2) (178, 19, 13) (179, 19, 14) (180, 19, 19) (181, 19, 20)
(182, 19, 41) (183, 20, 1) (184, 20, 2) (185, 20, 8) (186, 20, 9) (187, 20, 11) (188, 20, 42)
(189, 21, 1) (190, 21, 4) (191, 21, 10) (192, 21, 12) (193, 21, 23) (194, 21, 43) (195, 22, 2)
(196, 22, 6) (197, 22, 17) (198, 22, 21) (199, 22, 22) (200, 22, 44) (201, 23, 1) (202, 23, 13)
(203, 23, 14) (204, 23, 18) (205, 23, 45) (206, 24, 2) (207, 24, 3) (208, 24, 11) (209, 24, 19)
(210, 24, 46) (211, 25, 1) (212, 25, 4) (213, 25, 5) (214, 25, 12) (215, 25, 23) (216, 25, 47)
(217, 26, 2) (218, 26, 7) (219, 26, 8) (220, 26, 15) (221, 26, 48) (222, 27, 1) (223, 27, 3)
(224, 27, 5) (225, 27, 16) (226, 27, 49) (227, 28, 2) (228, 28, 7) (229, 28, 9) (230, 28, 50)
(231, 29, 1) (232, 29, 5) (233, 29, 20) (234, 29, 22) (235, 29, 51) (236, 30, 2) (237, 30, 15)
(238, 30, 19) (239, 30, 26) (240, 30, 52) (241, 31, 1) (242, 31, 11) (243, 31, 14) (244, 31, 25)
(245, 31, 53) (246, 32, 2) (247, 32, 8) (248, 32, 23) (249, 32, 26) (250, 32, 54) (251, 33, 1)
(252, 33, 13) (253, 33, 15) (254, 33, 25) (255, 33, 55) (256, 34, 2) (257, 34, 3) (258, 34, 12)
(259, 34, 22) (260, 34, 56) (261, 35, 1) (262, 35, 8) (263, 35, 16) (264, 35, 18) (265, 35, 57)
(266, 36, 2) (267, 36, 7) (268, 36, 13) (269, 36, 23) (270, 36, 58) (271, 37, 1) (272, 37, 15)
(273, 37, 16) (274, 37, 19) (275, 37, 59) (276, 38, 2) (277, 38, 14) (278, 38, 24) (279, 38, 60)
(280, 39, 1) (281, 39, 10) (282, 39, 11) (283, 39, 13) (284, 39, 61) (285, 40, 2) (286, 40, 4)
(287, 40, 8) (288, 40, 20) (289, 40, 62) (290, 41, 1) (291, 41, 9) (292, 41, 18) (293, 41, 63)
(294, 42, 2) (295, 42, 4) (296, 42, 10) (297, 42, 19) (298, 42, 64) (299, 43, 1) (300, 43, 5)
(301, 43, 25) (302, 43, 65) (303, 44, 2) (304, 44, 17) (305, 44, 19) (306, 44, 26) (307, 44, 66)
(308, 45, 1) (309, 45, 8) (310, 45, 10) (311, 45, 23) (312, 45, 67) (313, 46, 2) (314, 46, 7)
(315, 46, 11) (316, 46, 68)
NR用のLDPC基本行列 #2
(1, 1, 1) (2, 1, 2) (3, 1, 3) (4, 1, 4) (5, 1, 7) (6, 1, 10)
(7, 1, 11) (8, 1, 12) (9, 2, 1) (10, 2, 4) (11, 2, 5) (12, 2, 6) (13, 2, 7)
(14, 2, 8) (15, 2, 9) (16, 2, 10) (17, 2, 12) (18, 2, 13) (19, 3, 1) (20, 3, 2)
(21, 3, 4) (22, 3, 5) (23, 3, 9) (24, 3, 11) (25, 3, 13) (26, 3, 14) (27, 4, 2)
(28, 4, 3) (29, 4, 5) (30, 4, 6) (31, 4, 7) (32, 4, 8) (33, 4, 9) (34, 4, 10)
(35, 4, 11) (36, 4, 14) (37, 5, 1) (38, 5, 2) (39, 5, 12) (40, 5, 15) (41, 6, 1)
(42, 6, 2) (43, 6, 6) (44, 6, 8) (45, 6, 12) (46, 6, 16) (47, 7, 1) (48, 7, 6)
(49, 7, 8) (50, 7, 10) (51, 7, 12) (52, 7, 17) (53, 8, 2) (54, 8, 6) (55, 8, 8)
(56, 8, 12) (57, 8, 14) (58, 8, 18) (59, 9, 1) (60, 9, 2) (61, 9, 13) (62, 9, 19)
(63, 10, 2) (64, 10, 9) (65, 10, 11) (66, 10, 12) (67, 10, 20) (68, 11, 1) (69, 11, 2)
(70, 11, 7) (71, 11, 8) (72, 11, 21) (73, 12, 1) (74, 12, 8) (75, 12, 10) (76, 12, 14)
(77, 12, 22) (78, 13, 2) (79, 13, 4) (80, 13, 12) (81, 13, 23) (82, 14, 1) (83, 14, 2)
(84, 14, 9) (85, 14, 14) (86, 14, 24) (87, 15, 2) (88, 15, 7) (89, 15, 12) (90, 15, 14)
(91, 15, 25) (92, 16, 1) (93, 16, 11) (94, 16, 12) (95, 16, 26) (96, 17, 2) (97, 17, 10)
(98, 17, 12) (99, 17, 13) (100, 17, 27) (101, 18, 2) (102, 18, 6) (103, 18, 12) (104, 18, 13)
(105, 18, 28) (106, 19, 1) (107, 19, 7) (108, 19, 8) (109, 19, 29) (110, 20, 1) (111, 20, 2)
(112, 20, 11) (113, 20, 30) (114, 21, 2) (115, 21, 5) (116, 21, 12) (117, 21, 31) (118, 22, 1)
(119, 22, 9) (120, 22, 14) (121, 22, 32) (122, 23, 2) (123, 23, 3) (124, 23, 33) (125, 24, 1)
(126, 24, 4) (127, 24, 6) (128, 24, 34) (129, 25, 2) (130, 25, 3) (131, 25, 10) (132, 25, 35)
(133, 26, 1) (134, 26, 6) (135, 26, 36) (136, 27, 3) (137, 27, 8) (138, 27, 13) (139, 27, 14)
(140, 27, 37) (141, 28, 1) (142, 28, 7) (143, 28, 38) (144, 29, 2) (145, 29, 3) (146, 29, 6)
(147, 29, 39) (148, 30, 1) (149, 30, 5) (150, 30, 40) (151, 31, 3) (152, 31, 6) (153, 31, 8)
(154, 31, 10) (155, 31, 41) (156, 32, 2) (157, 32, 14) (158, 32, 42) (159, 33, 1) (160, 33, 6)
(161, 33, 13) (162, 33, 43) (163, 34, 3) (164, 34, 8) (165, 34, 11) (166, 34, 44) (167, 35, 1)
(168, 35, 13) (169, 35, 14) (170, 35, 45) (171, 36, 2) (172, 36, 6) (173, 36, 12) (174, 36, 46)
(175, 37, 1) (176, 37, 3) (177, 37, 8) (178, 37, 47) (179, 38, 11) (180, 38, 14) (181, 38, 48)
(182, 39, 2) (183, 39, 6) (184, 39, 12) (185, 39, 49) (186, 40, 1) (187, 40, 8) (188, 40, 13)
(189, 40, 50) (190, 41, 3) (191, 41, 11) (192, 41, 14) (193, 41, 51) (194, 42, 2) (195, 42, 6)
(196, 42, 12) (197, 42, 52)
既存の解決策に伴う問題は、フルパリティ検査行列(PCM)に対するACE制約が、通常、リフティング処理において考慮されることである。しかしながら、低いコードレート(符号化率)を有するフルPCMに対して高いACE値は、コード拡張を通して設計される、符号化率互換性を有するLDPC符号の高符号化率部分において有害なサイクルを依然としてもたらす。さらに、この制約は、特定の長さ以下の任意のサイクルが特定のACE制約を満たすように、設定される。典型的には、大きなサイクルに対して厳しいACE制約を満たす循環シフトを見つけることは困難であるため、ACE制約は緩和されなければならなくなり、それによって、より低いコネクティビティを有する有害な短いサイクルも生じてしまう。
既存の解決策に伴う問題は、フルPCMに対するACE制約が、通常、リフティング処理において考慮されることである。
対角拡張部分のために選択されたシフト係数は、度数1の変数ノードに対応し、いかなるサイクルの一部でもあり得ないため、符号のBLER性能のためには重要ではない。したがって、これらのシフト係数の最適化は不要である。
4, 175, 110, 199, 65, 149, 58, 24, 234, 204, 230, 154, 79, 207, 97, 124, 124, 1, 0, 116, 3, 42, 255, 57, 250, 165, 73, 104, 242, 111, 77, 144, 253, 234, 94, 0, 0, 0, 28, 50, 136, 83, 151, 172, 40, 78, 19, 131, 243, 222, 42, 210, 51, 156, 120, 0, 0, 251, 216, 5, 27, 91, 25, 103, 76, 20, 201, 9, 19, 61, 112, 71, 99, 14, 1, 0, 60, 124, 0, 33, 128, 140, 26, 113, 168, 203, 0, 158, 177, 174, 245, 144, 213, 145, 43, 0, 201, 247, 40, 232, 253, 55, 0, 120, 58, 11, 146, 46, 190, 12, 219, 21, 0, 106, 186, 143, 174, 243, 15, 136, 250, 0, 106, 240, 79, 200, 209, 13, 0, 93, 135, 20, 42, 133, 54, 52, 0, 103, 54, 47, 12, 110, 34, 0, 254, 58, 15, 224, 98, 0, 195, 179, 155, 162, 244, 113, 0, 95, 172, 183, 53, 100, 233, 0, 172, 108, 191, 112, 111, 0, 105, 122, 96, 98, 4, 0, 17, 218, 229, 135, 141, 0, 80, 235, 219, 245, 189, 0, 44, 219, 82, 103, 103, 0, 15, 236, 70, 1, 38, 0, 220, 101, 28, 105, 0, 218, 74, 201, 199, 0, 198, 228, 51, 117, 47, 0, 45, 73, 90, 209, 0, 100, 239, 137, 45, 0, 191, 176, 244, 0, 47, 87, 218, 5, 0, 12, 67, 191, 141, 0, 75, 22, 163, 180, 0, 207, 11, 253, 201, 0, 63, 113, 10, 122, 0, 0, 25, 89, 21, 0, 206, 119, 238, 45, 0, 112, 253, 183, 161, 0, 76, 43, 104, 22, 0, 28, 153, 35, 0, 130, 176, 193, 159, 0, 20, 100, 23, 221, 0, 190, 158, 38, 0, 127, 136, 185, 239, 0, 139, 109, 85, 0, 234, 210, 198, 0, 0, 106, 206, 66, 24, 0, 204, 223, 47, 0
●BG#1: セット2用のベクトル:
307, 19, 50, 369, 181, 216, 317, 288, 109, 17, 357, 215, 106, 242, 180, 330, 346, 1, 0, 76, 76, 73, 288, 144, 331, 331, 178, 295, 342, 217, 99, 354, 114, 331, 112, 0, 0, 0, 205, 250, 328, 332, 256, 161, 267, 160, 63, 129, 200, 88, 53, 131, 240, 205, 13, 0, 0, 276, 87, 0, 275, 199, 153, 56, 132, 305, 231, 341, 212, 304, 300, 271, 39, 357, 1, 0, 332, 181, 0, 195, 14, 115, 166, 241, 51, 157, 0, 278, 257, 1, 351, 92, 253, 18, 225, 0, 9, 62, 316, 333, 290, 114, 0, 307, 179, 165, 18, 39, 224, 368, 67, 170, 0, 366, 232, 321, 133, 57, 303, 63, 82, 0, 101, 339, 274, 111, 383, 354, 0, 48, 102, 8, 47, 188, 334, 115, 0, 77, 186, 174, 232, 50, 74, 0, 313, 177, 266, 115, 370, 0, 142, 248, 137, 89, 347, 12, 0, 241, 2, 210, 318, 55, 269, 0, 13, 338, 57, 289, 57, 0, 260, 303, 81, 358, 375, 0, 130, 163, 280, 132, 4, 0, 145, 213, 344, 242, 197, 0, 187, 206, 264, 341, 59, 0, 205, 102, 328, 213, 97, 0, 30, 11, 233, 22, 0, 24, 89, 61, 27, 0, 298, 158, 235, 339, 234, 0, 72, 17, 383, 312, 0, 71, 81, 76, 136, 0, 194, 194, 101, 0, 222, 19, 244, 274, 0, 252, 5, 147, 78, 0, 159, 229, 260, 90, 0, 100, 215, 258, 256, 0, 102, 201, 175, 287, 0, 323, 8, 361, 105, 0, 230, 148, 202, 312, 0, 320, 335, 2, 266, 0, 210, 313, 297, 21, 0, 269, 82, 115, 0, 185, 177, 289, 214, 0, 258, 93, 346, 297, 0, 175, 37, 312, 0, 52, 314, 139, 288, 0, 113, 14, 218, 0, 113, 132, 114, 168, 0, 80, 78, 163, 274, 0, 135, 149, 15, 0
●BG#1: セット3用のベクトル:
247, 198, 124, 265, 245, 5, 266, 57, 319, 30, 150, 76, 312, 257, 213, 234, 156, 1, 0, 97, 156, 89, 173, 236, 184, 261, 55, 298, 311, 170, 219, 30, 52, 49, 253, 0, 0, 0, 121, 62, 121, 216, 106, 238, 215, 108, 242, 82, 90, 124, 285, 147, 179, 141, 40, 0, 0, 74, 153, 109, 215, 136, 99, 213, 111, 176, 179, 213, 143, 119, 88, 43, 56, 86, 1, 0, 261, 247, 0, 32, 285, 3, 256, 73, 45, 268, 0, 310, 232, 149, 98, 151, 17, 83, 255, 0, 69, 303, 214, 308, 160, 143, 0, 36, 105, 140, 38, 144, 38, 45, 237, 293, 0, 162, 318, 53, 265, 252, 143, 111, 263, 0, 248, 299, 214, 227, 298, 159, 0, 98, 101, 27, 88, 162, 56, 293, 0, 57, 31, 106, 81, 20, 305, 0, 7, 216, 244, 284, 222, 0, 316, 57, 217, 55, 186, 92, 0, 255, 170, 81, 302, 48, 140, 0, 222, 211, 288, 143, 24, 0, 24, 296, 20, 102, 212, 0, 189, 13, 164, 315, 83, 0, 207, 214, 15, 195, 301, 0, 290, 64, 126, 79, 7, 0, 104, 182, 139, 70, 127, 0, 221, 60, 126, 74, 0, 210, 284, 122, 290, 0, 300, 140, 128, 191, 28, 0, 287, 193, 297, 248, 0, 72, 305, 3, 46, 0, 15, 99, 30, 0, 139, 309, 304, 9, 0, 231, 49, 162, 128, 0, 84, 278, 163, 194, 0, 33, 96, 132, 58, 0, 210, 175, 146, 181, 0, 90, 252, 227, 307, 0, 28, 3, 98, 6, 0, 98, 79, 274, 227, 0, 189, 184, 129, 252, 0, 225, 271, 184, 0, 210, 28, 311, 68, 0, 201, 223, 313, 272, 0, 48, 56, 233, 0, 280, 74, 221, 319, 0, 141, 235, 126, 0, 303, 242, 52, 91, 0, 302, 265, 181, 160, 0, 237, 307, 40, 0
●BG#1: セット4用のベクトル:
126, 197, 52, 193, 176, 190, 51, 129, 47, 21, 187, 2, 86, 170, 196, 46, 53, 1, 0, 44, 87, 21, 163, 117, 17, 107, 127, 148, 114, 20, 8, 40, 23, 69, 71, 0, 0, 0, 216, 104, 134, 19, 12, 17, 143, 68, 145, 160, 65, 98, 178, 91, 210, 173, 75, 0, 0, 37, 158, 111, 134, 117, 138, 139, 59, 146, 149, 197, 117, 48, 28, 127, 71, 177, 1, 0, 88, 99, 0, 14, 179, 106, 132, 129, 149, 60, 0, 145, 92, 127, 172, 62, 79, 59, 58, 0, 207, 32, 216, 209, 118, 69, 0, 169, 209, 123, 223, 189, 214, 47, 85, 111, 0, 32, 77, 81, 17, 18, 169, 157, 6, 0, 201, 87, 166, 83, 34, 52, 0, 204, 196, 45, 44, 196, 91, 124, 0, 119, 129, 43, 28, 16, 206, 0, 35, 131, 153, 218, 195, 0, 62, 86, 28, 91, 7, 4, 0, 31, 1, 63, 167, 152, 216, 0, 132, 105, 108, 156, 110, 0, 44, 78, 155, 218, 173, 0, 172, 211, 12, 199, 219, 0, 105, 135, 56, 74, 103, 0, 208, 159, 190, 182, 199, 0, 125, 209, 202, 18, 0, 0, 108, 28, 118, 20, 0, 31, 203, 179, 96, 0, 217, 183, 68, 84, 35, 0, 174, 42, 38, 121, 0, 125, 25, 109, 92, 0, 108, 61, 188, 0, 174, 70, 49, 142, 0, 180, 17, 104, 156, 0, 71, 52, 27, 42, 0, 130, 89, 138, 216, 0, 207, 54, 220, 50, 0, 28, 148, 165, 78, 0, 206, 32, 156, 50, 0, 2, 132, 119, 213, 0, 64, 193, 99, 23, 0, 216, 124, 150, 0, 164, 41, 123, 23, 0, 29, 29, 43, 111, 0, 85, 28, 223, 0, 57, 211, 115, 62, 0, 184, 111, 30, 0, 47, 126, 189, 26, 0, 20, 187, 38, 137, 0, 41, 186, 135, 0
●BG#1: セット5用のベクトル:
2, 233, 219, 231, 113, 201, 126, 58, 228, 225, 181, 28, 71, 255, 174, 13, 63, 1, 0, 141, 144, 144, 149, 82, 125, 247, 211, 16, 276, 183, 215, 115, 111, 208, 101, 0, 0, 0, 234, 143, 6, 157, 37, 13, 107, 186, 11, 6, 218, 257, 225, 100, 133, 150, 58, 0, 0, 276, 148, 142, 278, 88, 16, 2, 217, 150, 227, 11, 133, 12, 72, 127, 145, 41, 1, 0, 214, 147, 0, 11, 184, 238, 169, 30, 33, 63, 0, 158, 116, 78, 152, 46, 186, 130, 155, 0, 279, 70, 15, 176, 228, 144, 0, 187, 279, 181, 265, 10, 49, 45, 146, 128, 0, 67, 230, 107, 63, 36, 64, 154, 162, 0, 244, 274, 178, 0, 40, 77, 0, 38, 181, 49, 109, 109, 199, 167, 0, 131, 34, 212, 242, 142, 11, 0, 118, 213, 130, 147, 279, 0, 123, 30, 275, 95, 184, 219, 0, 89, 77, 287, 114, 134, 262, 0, 161, 72, 157, 271, 65, 0, 7, 241, 201, 214, 280, 0, 180, 133, 99, 225, 208, 0, 176, 5, 278, 99, 95, 0, 52, 145, 28, 280, 241, 0, 240, 61, 82, 183, 251, 0, 82, 64, 218, 118, 0, 280, 64, 209, 66, 0, 90, 54, 15, 241, 253, 0, 130, 149, 62, 250, 0, 236, 225, 132, 133, 0, 113, 278, 116, 0, 135, 100, 67, 283, 0, 60, 240, 115, 67, 0, 197, 171, 54, 184, 0, 144, 64, 61, 105, 0, 102, 27, 33, 129, 0, 243, 163, 138, 138, 0, 116, 37, 189, 169, 0, 2, 107, 197, 46, 0, 133, 270, 144, 183, 0, 13, 99, 239, 0, 122, 10, 79, 134, 0, 59, 40, 43, 133, 0, 172, 34, 83, 0, 1, 188, 19, 78, 0, 5, 40, 147, 0, 187, 155, 176, 180, 0, 272, 198, 183, 237, 0, 270, 29, 100, 0
●BG#1: セット6用のベクトル:
74, 41, 309, 17, 133, 68, 327, 282, 181, 153, 85, 343, 153, 4, 253, 113, 44, 1, 0, 18, 260, 68, 321, 188, 127, 131, 345, 197, 44, 302, 191, 191, 161, 3, 239, 0, 0, 0, 135, 123, 338, 313, 65, 256, 160, 179, 56, 264, 47, 158, 100, 148, 146, 75, 250, 0, 0, 129, 279, 294, 214, 207, 297, 266, 70, 39, 149, 307, 229, 0, 97, 45, 324, 338, 1, 0, 158, 116, 0, 292, 37, 269, 87, 21, 233, 75, 0, 135, 332, 328, 31, 321, 348, 28, 170, 0, 177, 155, 53, 284, 205, 207, 0, 83, 234, 125, 106, 71, 256, 324, 15, 195, 0, 291, 110, 22, 6, 53, 316, 345, 175, 0, 285, 302, 25, 286, 252, 332, 0, 107, 67, 139, 158, 32, 232, 307, 0, 285, 160, 249, 154, 5, 49, 0, 195, 99, 331, 276, 41, 0, 125, 191, 238, 339, 171, 244, 0, 349, 28, 0, 275, 350, 110, 0, 11, 15, 308, 246, 293, 0, 279, 284, 284, 2, 166, 0, 253, 122, 310, 43, 127, 0, 69, 21, 340, 155, 146, 0, 297, 6, 141, 25, 304, 0, 216, 203, 116, 119, 220, 0, 256, 154, 338, 207, 0, 168, 309, 195, 143, 0, 67, 255, 179, 316, 116, 0, 349, 166, 283, 277, 0, 119, 338, 19, 111, 0, 195, 252, 108, 0, 21, 128, 231, 346, 0, 207, 222, 234, 286, 0, 151, 100, 174, 143, 0, 326, 296, 153, 200, 0, 157, 244, 131, 196, 0, 312, 110, 146, 60, 0, 266, 268, 306, 95, 0, 129, 300, 274, 165, 0, 235, 188, 230, 279, 0, 11, 117, 68, 0, 160, 124, 340, 173, 0, 104, 302, 110, 248, 0, 9, 250, 63, 0, 24, 327, 48, 185, 0, 345, 348, 250, 0, 155, 71, 99, 233, 0, 203, 194, 185, 245, 0, 280, 218, 171, 0
●BG#1: セット7用のベクトル:
18, 42, 124, 101, 177, 196, 133, 181, 205, 201, 168, 86, 95, 86, 201, 193, 172, 1, 0, 117, 55, 192, 46, 167, 97, 110, 167, 129, 198, 75, 49, 200, 200, 178, 168, 0, 0, 0, 121, 30, 63, 84, 83, 96, 121, 31, 94, 141, 163, 20, 56, 85, 19, 90, 12, 0, 0, 162, 1, 14, 119, 125, 21, 154, 83, 73, 53, 121, 63, 111, 187, 174, 98, 35, 1, 0, 80, 21, 0, 158, 94, 134, 189, 203, 54, 24, 0, 8, 183, 32, 189, 124, 75, 105, 94, 0, 102, 61, 69, 142, 44, 121, 0, 203, 171, 155, 105, 11, 3, 40, 22, 139, 0, 83, 73, 39, 23, 148, 95, 58, 148, 0, 160, 21, 173, 91, 46, 2, 0, 64, 126, 133, 74, 32, 83, 184, 0, 65, 174, 82, 52, 49, 18, 0, 70, 66, 130, 41, 122, 0, 3, 92, 155, 110, 0, 99, 0, 122, 36, 75, 148, 76, 59, 0, 117, 71, 193, 65, 129, 0, 115, 189, 41, 180, 27, 0, 7, 121, 47, 75, 194, 0, 4, 164, 72, 45, 84, 0, 178, 49, 141, 107, 66, 0, 70, 81, 83, 196, 53, 0, 75, 193, 109, 89, 0, 10, 11, 105, 168, 0, 26, 89, 206, 66, 32, 0, 16, 151, 141, 73, 0, 114, 119, 15, 19, 0, 95, 125, 97, 0, 112, 19, 118, 38, 0, 97, 19, 31, 11, 0, 47, 8, 139, 46, 0, 152, 151, 136, 28, 0, 101, 187, 29, 156, 0, 50, 126, 121, 133, 0, 189, 174, 177, 171, 0, 39, 110, 200, 32, 0, 14, 205, 29, 131, 0, 62, 196, 177, 0, 51, 129, 155, 162, 0, 199, 196, 109, 19, 0, 122, 82, 170, 0, 168, 98, 66, 47, 0, 128, 202, 192, 0, 145, 56, 101, 201, 0, 177, 189, 108, 64, 0, 141, 154, 90, 0
●BG#1: セット8用のベクトル:
76, 22, 133, 38, 162, 197, 52, 166, 214, 199, 144, 93, 139, 192, 134, 1, 124, 1, 0, 148, 67, 90, 54, 215, 220, 66, 222, 225, 83, 220, 226, 215, 140, 167, 59, 0, 0, 0, 154, 57, 212, 232, 44, 27, 213, 191, 203, 54, 123, 164, 0, 217, 79, 230, 90, 0, 0, 150, 123, 133, 196, 125, 58, 18, 206, 131, 42, 105, 0, 223, 131, 69, 149, 173, 1, 0, 118, 63, 0, 153, 195, 59, 200, 202, 19, 146, 0, 150, 115, 12, 52, 175, 180, 111, 95, 0, 135, 195, 125, 25, 163, 88, 0, 149, 69, 7, 43, 63, 82, 50, 26, 124, 0, 37, 191, 72, 3, 178, 13, 169, 209, 0, 187, 198, 24, 20, 189, 217, 0, 192, 179, 10, 73, 36, 139, 235, 0, 68, 238, 194, 57, 175, 44, 0, 158, 169, 5, 56, 227, 0, 42, 201, 94, 108, 73, 154, 0, 25, 186, 79, 194, 99, 182, 0, 71, 14, 114, 16, 96, 0, 160, 61, 215, 47, 36, 0, 15, 18, 91, 154, 71, 0, 196, 124, 122, 128, 189, 0, 3, 53, 42, 101, 103, 0, 94, 119, 174, 212, 199, 0, 107, 37, 7, 206, 0, 207, 93, 143, 39, 0, 171, 36, 124, 41, 124, 0, 138, 61, 14, 203, 0, 43, 108, 47, 176, 0, 167, 166, 144, 0, 114, 71, 182, 181, 0, 99, 73, 26, 81, 0, 152, 45, 71, 70, 0, 140, 190, 85, 123, 0, 74, 213, 52, 43, 0, 61, 206, 42, 45, 0, 135, 231, 140, 95, 0, 218, 211, 44, 181, 0, 147, 223, 21, 154, 0, 231, 82, 161, 0, 174, 224, 52, 111, 0, 63, 226, 187, 143, 0, 74, 227, 179, 0, 151, 189, 127, 179, 0, 199, 115, 188, 0, 51, 149, 42, 38, 0, 3, 215, 216, 72, 0, 37, 132, 212, 0
●BG#2: セット1用のベクトル:
251, 21, 141, 195, 196, 158, 1, 0, 113, 36, 178, 173, 114, 104, 160, 81, 0, 0, 168, 237, 214, 109, 163, 0, 0, 0, 153, 55, 167, 51, 96, 109, 112, 101, 1, 0, 129, 153, 147, 0, 39, 215, 128, 109, 31, 0, 177, 22, 133, 164, 72, 0, 180, 178, 186, 64, 209, 0, 114, 246, 38, 0, 147, 180, 77, 24, 0, 193, 215, 100, 222, 0, 243, 92, 170, 183, 0, 223, 119, 229, 0, 204, 184, 13, 49, 0, 198, 199, 138, 209, 0, 87, 40, 98, 0, 24, 103, 23, 78, 0, 71, 249, 149, 40, 0, 123, 99, 45, 0, 13, 222, 140, 0, 117, 224, 108, 0, 28, 168, 213, 0, 149, 62, 0, 181, 217, 156, 0, 114, 196, 228, 0, 104, 0, 0, 204, 114, 187, 51, 0, 113, 233, 0, 114, 213, 194, 0, 233, 191, 0, 167, 94, 67, 9, 0, 216, 217, 0, 93, 209, 218, 0, 216, 96, 171, 0, 142, 125, 164, 0, 68, 0, 243, 0, 99, 246, 20, 0, 205, 36, 0, 241, 146, 27, 0, 138, 228, 53, 0, 85, 14, 254, 0, 78, 205, 70, 0
●BG#2: セット2用のベクトル:
86, 338, 258, 27, 328, 265, 1, 0, 183, 11, 213, 329, 272, 155, 89, 214, 0, 0, 382, 288, 4, 377, 72, 0, 0, 0, 318, 13, 91, 80, 173, 116, 305, 9, 1, 0, 281, 189, 23, 0, 94, 256, 328, 100, 105, 0, 356, 333, 372, 109, 215, 0, 294, 63, 362, 30, 188, 0, 206, 39, 330, 0, 29, 77, 284, 241, 0, 135, 60, 12, 14, 0, 111, 259, 328, 196, 0, 256, 218, 319, 0, 369, 302, 238, 288, 0, 275, 357, 336, 115, 0, 186, 100, 215, 0, 289, 300, 9, 365, 0, 12, 284, 112, 248, 0, 69, 368, 331, 0, 333, 324, 314, 0, 322, 121, 188, 0, 321, 75, 5, 0, 47, 37, 0, 278, 381, 240, 0, 256, 201, 311, 0, 78, 191, 0, 52, 179, 92, 213, 0, 298, 81, 0, 45, 36, 189, 0, 120, 56, 0, 311, 214, 332, 155, 0, 48, 15, 0, 185, 89, 216, 0, 13, 48, 364, 0, 194, 116, 52, 0, 16, 56, 283, 0, 102, 307, 321, 0, 356, 246, 0, 363, 334, 259, 0, 291, 164, 334, 0, 82, 225, 104, 0, 363, 131, 294, 0
●BG#2: セット3用のベクトル:
104, 183, 45, 64, 143, 245, 1, 0, 295, 49, 30, 209, 24, 209, 7, 51, 0, 0, 220, 14, 158, 297, 308, 0, 0, 0, 12, 253, 82, 185, 43, 267, 193, 95, 1, 0, 17, 80, 219, 0, 141, 237, 276, 91, 275, 0, 8, 74, 247, 288, 247, 0, 231, 95, 73, 235, 102, 0, 7, 258, 80, 0, 85, 58, 319, 55, 0, 229, 194, 139, 78, 0, 189, 0, 29, 176, 0, 245, 64, 91, 0, 297, 104, 298, 139, 0, 191, 114, 232, 94, 0, 116, 255, 176, 0, 43, 39, 72, 257, 0, 109, 157, 103, 306, 0, 156, 204, 93, 0, 213, 137, 207, 0, 37, 272, 65, 0, 61, 71, 287, 0, 305, 228, 0, 136, 142, 178, 0, 291, 89, 21, 0, 284, 254, 0, 0, 202, 190, 249, 0, 159, 138, 0, 217, 116, 236, 0, 160, 97, 0, 37, 155, 219, 74, 0, 237, 222, 0, 95, 0, 299, 0, 62, 199, 235, 0, 112, 17, 276, 0, 61, 4, 103, 0, 183, 112, 171, 0, 207, 138, 0, 20, 201, 6, 0, 173, 289, 153, 0, 308, 7, 218, 0, 4, 294, 97, 0
●BG#2: セット4用のベクトル:
72, 110, 23, 181, 95, 8, 1, 0, 53, 156, 115, 156, 115, 200, 29, 31, 0, 0, 152, 131, 46, 191, 91, 0, 0, 0, 185, 6, 36, 124, 124, 110, 156, 133, 1, 0, 200, 16, 101, 0, 185, 138, 170, 219, 193, 0, 123, 55, 31, 222, 209, 0, 103, 13, 105, 150, 181, 0, 147, 43, 152, 0, 2, 30, 184, 83, 0, 174, 150, 8, 56, 0, 99, 138, 110, 99, 0, 46, 217, 109, 0, 37, 113, 143, 140, 0, 36, 95, 40, 116, 0, 116, 200, 110, 0, 75, 158, 134, 97, 0, 48, 132, 206, 2, 0, 68, 16, 156, 0, 35, 138, 86, 0, 6, 20, 141, 0, 80, 43, 81, 0, 49, 1, 0, 156, 54, 134, 0, 153, 88, 63, 0, 211, 94, 0, 90, 6, 221, 6, 0, 27, 118, 0, 216, 212, 193, 0, 108, 61, 0, 106, 44, 185, 176, 0, 147, 182, 0, 108, 21, 110, 0, 71, 12, 109, 0, 29, 201, 69, 0, 91, 165, 55, 0, 1, 175, 83, 0, 40, 12, 0, 37, 97, 46, 0, 106, 181, 154, 0, 98, 35, 36, 0, 120, 101, 81, 0
●BG#2: セット5用のベクトル:
275, 93, 240, 20, 275, 55, 1, 0, 158, 123, 216, 68, 260, 238, 247, 164, 0, 0, 124, 243, 183, 31, 116, 0, 0, 0, 15, 268, 237, 210, 170, 64, 180, 217, 1, 0, 276, 119, 153, 0, 193, 50, 270, 5, 111, 0, 226, 78, 73, 170, 224, 0, 272, 68, 161, 122, 197, 0, 162, 92, 127, 0, 108, 17, 175, 82, 0, 29, 1, 118, 269, 0, 96, 23, 83, 161, 0, 18, 98, 19, 0, 50, 46, 277, 66, 0, 19, 158, 87, 84, 0, 207, 40, 225, 0, 15, 117, 201, 218, 0, 116, 237, 283, 216, 0, 283, 82, 61, 0, 238, 142, 19, 0, 13, 189, 75, 0, 41, 81, 229, 0, 23, 175, 0, 207, 285, 61, 0, 227, 26, 128, 0, 183, 212, 0, 131, 222, 17, 190, 0, 64, 257, 0, 139, 117, 153, 0, 69, 62, 0, 131, 81, 160, 238, 0, 53, 236, 0, 85, 269, 37, 0, 94, 225, 192, 0, 213, 16, 246, 0, 50, 215, 175, 0, 40, 70, 142, 0, 184, 43, 0, 225, 112, 9, 0, 246, 181, 204, 0, 115, 105, 245, 0, 267, 222, 162, 0
●BG#2: セット6用のベクトル:
49, 301, 326, 81, 216, 202, 1, 0, 303, 167, 145, 45, 69, 117, 139, 129, 0, 0, 139, 172, 19, 309, 270, 0, 0, 0, 310, 156, 148, 153, 118, 222, 2, 5, 1, 0, 203, 299, 343, 0, 35, 53, 304, 325, 36, 0, 153, 68, 27, 232, 76, 0, 107, 136, 265, 205, 124, 0, 202, 269, 122, 0, 127, 103, 290, 23, 0, 104, 64, 319, 215, 0, 49, 156, 71, 224, 0, 203, 81, 157, 0, 193, 221, 74, 92, 0, 327, 146, 252, 217, 0, 199, 20, 319, 0, 18, 12, 230, 125, 0, 285, 91, 245, 317, 0, 253, 50, 105, 0, 269, 107, 121, 0, 279, 252, 67, 0, 109, 19, 225, 0, 117, 236, 0, 256, 100, 267, 0, 114, 162, 127, 0, 213, 277, 0, 210, 208, 308, 106, 0, 130, 30, 0, 332, 92, 52, 0, 9, 217, 0, 129, 206, 208, 218, 0, 98, 135, 0, 186, 178, 136, 0, 286, 84, 160, 0, 265, 46, 78, 0, 162, 35, 281, 0, 278, 52, 203, 0, 196, 332, 0, 5, 211, 1, 0, 314, 300, 194, 0, 321, 203, 271, 0, 82, 70, 229, 0
●BG#2: セット7用のベクトル:
84, 189, 77, 26, 112, 156, 1, 0, 170, 27, 124, 115, 141, 151, 91, 174, 0, 0, 95, 131, 118, 133, 114, 0, 0, 0, 26, 31, 89, 85, 39, 62, 190, 14, 1, 0, 103, 54, 29, 0, 28, 82, 90, 51, 200, 0, 166, 48, 146, 138, 109, 0, 8, 86, 137, 103, 30, 0, 84, 195, 26, 0, 112, 6, 37, 106, 0, 102, 147, 9, 171, 0, 58, 9, 64, 192, 0, 7, 84, 168, 0, 114, 76, 182, 85, 0, 181, 114, 7, 15, 0, 166, 114, 148, 0, 188, 85, 171, 20, 0, 109, 76, 167, 9, 0, 171, 37, 50, 0, 97, 140, 194, 0, 24, 154, 158, 0, 22, 17, 137, 0, 101, 98, 0, 132, 90, 62, 0, 77, 44, 91, 0, 47, 120, 0, 81, 71, 49, 159, 0, 150, 87, 0, 18, 94, 61, 0, 197, 192, 0, 37, 79, 106, 125, 0, 168, 40, 0, 35, 81, 0, 0, 69, 17, 83, 0, 94, 160, 40, 0, 129, 5, 135, 0, 75, 86, 164, 0, 110, 139, 0, 70, 203, 139, 0, 23, 199, 94, 0, 189, 139, 207, 0, 135, 118, 155, 0
●BG#2: セット8用のベクトル:
116, 157, 79, 101, 237, 13, 1, 0, 80, 89, 38, 24, 10, 156, 226, 99, 0, 0, 83, 84, 139, 155, 158, 0, 0, 0, 72, 220, 151, 176, 154, 161, 147, 66, 1, 0, 154, 224, 214, 0, 64, 27, 108, 85, 130, 0, 87, 107, 107, 19, 65, 0, 137, 35, 237, 124, 30, 0, 20, 10, 65, 0, 231, 224, 179, 108, 0, 24, 38, 236, 174, 0, 33, 207, 105, 33, 0, 10, 30, 200, 0, 210, 30, 41, 207, 0, 65, 105, 231, 154, 0, 76, 169, 210, 0, 203, 62, 26, 95, 0, 169, 27, 94, 67, 0, 101, 213, 201, 0, 120, 29, 188, 0, 233, 123, 68, 0, 178, 200, 13, 0, 160, 230, 0, 172, 142, 126, 0, 198, 95, 216, 0, 64, 197, 0, 227, 116, 95, 61, 0, 55, 113, 0, 62, 163, 113, 0, 110, 132, 0, 65, 192, 5, 84, 0, 0, 197, 0, 227, 131, 61, 0, 24, 80, 30, 0, 158, 29, 127, 0, 132, 76, 92, 0, 70, 224, 206, 0, 22, 199, 0, 52, 95, 239, 0, 101, 206, 226, 0, 122, 102, 72, 0, 80, 63, 122, 0
セット2の基本グラフ#1について、Vi,jの行列表現の一例が以下に示される。同じ行の成分はカンマで区切られ、行はセミコロンで区切られる。
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セット4の基本グラフ#2についての、Vi,jの行列表現の一例が以下に示される。同じ行の成分はカンマで区切られ、行はセミコロンで区切られる。
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ACE値だけでなく、最悪の場合のACEを満たすサイクル数も重要である。より困難な制約を満たすエッジを追加しようと試み、成功しなかった場合、これらの制約を一時的に下げることによって、この数を減らす。コードのさらなる最適化は、指定された制約から開始することを有するが、各etaACE値に1が加えられる。すべての制約を満たすシフト係数を見つけることができない場合、その特定の変数ノードのいくつかのetaACE値を1だけ減らし(オリジナルの指定値に戻り)、制約を満たすシフト係数が見つかるまで再度試みる。
例えば、プロセッシング回路920は、抵抗器、キャパシタ、インダクタ、トランジスタ、ダイオード、および/または任意の他の適切な回路部品を含み得る。
特定の実施形態では、符号化/復号モジュール1052は、プロセッシング回路1020を含んでもよく、またはプロセッシング回路1020に含まれてもよい。特定の実施の形態では、符号化/復号化モジュール1052は、受信モジュール1050および送信モジュール1054と通信する。
3GPP 第三世代パートナーシップ・プロジェクト
ACE 近似サイクルEMD
BTS 無線送受信機局
D2D デバイス・ツー・デバイス
EMD 外因的メッセージ度
eNB eNodeB
FDD 周波数分割複信
LDPC 低密度パリティ検査
LTE ロングタームエボリューション
MAC 媒体アクセス制御
M2M マシン・ツー・マシン
MIMO 多入力多出力(マルチインプット・マルチアウトプット)
MTC マシンタイプ通信
NR 新無線(ニューレディオ)
OFDM 直交周波数分割多重方式
PCM パリティ検査行列
PDSCH 物理ダウンリンク共有チャネル
PUCCH 物理アップリンク制御チャネル
RAN 無線アクセスネットワーク
RAT 無線アクセス技術
RBS 無線基地局
RNC 無線ネットワーク制御装置
RRC 無線リソース制御
RRH リモート無線ヘッド
RRU リモート無線ユニット
SINR 信号対干渉雑音比
TDD 時分割複信
UE ユーザ機器
UL アップリンク
URLLC 超高信頼低レイテンシー通信
UTRAN ユニバーサル地上無線アクセスネットワーク
WAN 無線ネットワーク
Claims (16)
- プロセッシング回路(920、1020)を含む無線送信機(110、120)であって、前記プロセッシング回路(920、1020)は、
低密度パリティ検査、LDPC、符号のパリティ検査行列、PCM、を使用して情報ビットを符号化し、ここで、前記PCMは、サイズがZxZである正方部分行列に分割されており、基本行列とシフトベクトルとにより、jが0、1、2、3、4、5、6および7のうちの1つであるシフトサイズZ = 3×2^jを使用して記述されており、
前記符号化された情報ビットを無線受信機(110、120)に送信するように動作可能であり、
前記基本行列は、各ZxZの部分行列について一つの成分を有しており、当該成分のうち、ゼロ行列である前記部分行列に対応するものは0であり、当該成分のうち、k個の成分だけ右に列を巡回的にシフトすることによりZxZの単位行列から得られる巡回置換行列である前記部分行列に対応するものは1であり、
前記基本行列は46x68のサイズを有し、当該基本行列においてゼロでない成分はトリプルズ(e, r, c)によって記述され、当該トリプルズ(e, r, c)は、eと番号付けされたゼロでない成分が前記基本行列における行r、列cに存在することを示すものであり、当該トリプルズは、
(1, 1, 1) (2, 1, 2) (3, 1, 3) (4, 1, 4) (5, 1, 6) (6, 1, 7) (7, 1, 10) (8, 1, 11) (9, 1, 12) (10, 1, 13) (11, 1, 14) (12, 1, 16) (13, 1, 17) (14, 1, 19) (15, 1, 20) (16, 1, 21) (17, 1, 22) (18, 1, 23) (19, 1, 24) (20, 2, 1) (21, 2, 3) (22, 2, 4) (23, 2, 5) (24, 2, 6) (25, 2, 8) (26, 2, 9) (27, 2, 10) (28, 2, 12) (29, 2, 13) (30, 2, 15) (31, 2, 16) (32, 2, 17) (33, 2, 18) (34, 2, 20) (35, 2, 22) (36, 2, 23) (37, 2, 24) (38, 2, 25) (39, 3, 1) (40, 3, 2) (41, 3, 3) (42, 3, 5) (43, 3, 6) (44, 3, 7) (45, 3, 8) (46, 3, 9) (47, 3, 10) (48, 3, 11) (49, 3, 14) (50, 3, 15) (51, 3, 16) (52, 3, 18) (53, 3, 19) (54, 3, 20) (55, 3, 21) (56, 3, 25) (57, 3, 26) (58, 4, 1) (59, 4, 2) (60, 4, 4) (61, 4, 5) (62, 4, 7) (63, 4, 8) (64, 4, 9) (65, 4, 11) (66, 4, 12) (67, 4, 13) (68, 4, 14) (69, 4, 15) (70, 4, 17) (71, 4, 18) (72, 4, 19) (73, 4, 21) (74, 4, 22) (75, 4, 23) (76, 4, 26) (77, 5, 1) (78, 5, 2) (79, 5, 27) (80, 6, 1) (81, 6, 2) (82, 6, 4) (83, 6, 13) (84, 6, 17) (85, 6, 22) (86, 6, 23) (87, 6, 28) (88, 7, 1) (89, 7, 7) (90, 7, 11) (91, 7, 12) (92, 7, 14) (93, 7, 18) (94, 7, 19) (95, 7, 21) (96, 7, 29) (97, 8, 1) (98, 8, 2) (99, 8, 5) (100, 8, 8) (101, 8, 9) (102, 8, 15) (103, 8, 30) (104, 9, 1) (105, 9, 2) (106, 9, 4) (107, 9, 13) (108, 9, 17) (109, 9, 20) (110, 9, 22) (111, 9, 23) (112, 9, 25) (113, 9, 31) (114, 10, 1) (115, 10, 2) (116, 10, 11) (117, 10, 12) (118, 10, 14) (119, 10, 18) (120, 10, 19) (121, 10, 21) (122, 10, 32) (123, 11, 2) (124, 11, 3) (125, 11, 5) (126, 11, 8) (127, 11, 9) (128, 11, 15) (129, 11, 33) (130, 12, 1) (131, 12, 2) (132, 12, 13) (133, 12, 17) (134, 12, 22) (135, 12, 23) (136, 12, 24) (137, 12, 34) (138, 13, 1) (139, 13, 2) (140, 13, 11) (141, 13, 12) (142, 13, 14) (143, 13, 19) (144, 13, 35) (145, 14, 1) (146, 14, 4) (147, 14, 8) (148, 14, 21) (149, 14, 24) (150, 14, 36) (151, 15, 1) (152, 15, 13) (153, 15, 16) (154, 15, 17) (155, 15, 18) (156, 15, 22) (157, 15, 37) (158, 16, 1) (159, 16, 2) (160, 16, 11) (161, 16, 14) (162, 16, 19) (163, 16, 26) (164, 16, 38) (165, 17, 2) (166, 17, 4) (167, 17, 12) (168, 17, 21) (169, 17, 23) (170, 17, 39) (171, 18, 1) (172, 18, 15) (173, 18, 17) (174, 18, 18) (175, 18, 22) (176, 18, 40) (177, 19, 2) (178, 19, 13) (179, 19, 14) (180, 19, 19) (181, 19, 20) (182, 19, 41) (183, 20, 1) (184, 20, 2) (185, 20, 8) (186, 20, 9) (187, 20, 11) (188, 20, 42) (189, 21, 1) (190, 21, 4) (191, 21, 10) (192, 21, 12) (193, 21, 23) (194, 21, 43) (195, 22, 2) (196, 22, 6) (197, 22, 17) (198, 22, 21) (199, 22, 22) (200, 22, 44) (201, 23, 1) (202, 23, 13) (203, 23, 14) (204, 23, 18) (205, 23, 45) (206, 24, 2) (207, 24, 3) (208, 24, 11) (209, 24, 19) (210, 24, 46) (211, 25, 1) (212, 25, 4) (213, 25, 5) (214, 25, 12) (215, 25, 23) (216, 25, 47) (217, 26, 2) (218, 26, 7) (219, 26, 8) (220, 26, 15) (221, 26, 48) (222, 27, 1) (223, 27, 3) (224, 27, 5) (225, 27, 16) (226, 27, 49) (227, 28, 2) (228, 28, 7) (229, 28, 9) (230, 28, 50) (231, 29, 1) (232, 29, 5) (233, 29, 20) (234, 29, 22) (235, 29, 51) (236, 30, 2) (237, 30, 15) (238, 30, 19) (239, 30, 26) (240, 30, 52) (241, 31, 1) (242, 31, 11) (243, 31, 14) (244, 31, 25) (245, 31, 53) (246, 32, 2) (247, 32, 8) (248, 32, 23) (249, 32, 26) (250, 32, 54) (251, 33, 1) (252, 33, 13) (253, 33, 15) (254, 33, 25) (255, 33, 55) (256, 34, 2) (257, 34, 3) (258, 34, 12) (259, 34, 22) (260, 34, 56) (261, 35, 1) (262, 35, 8) (263, 35, 16) (264, 35, 18) (265, 35, 57) (266, 36, 2) (267, 36, 7) (268, 36, 13) (269, 36, 23) (270, 36, 58) (271, 37, 1) (272, 37, 15) (273, 37, 16) (274, 37, 19) (275, 37, 59) (276, 38, 2) (277, 38, 14) (278, 38, 24) (279, 38, 60) (280, 39, 1) (281, 39, 10) (282, 39, 11) (283, 39, 13) (284, 39, 61) (285, 40, 2) (286, 40, 4) (287, 40, 8) (288, 40, 20) (289, 40, 62) (290, 41, 1) (291, 41, 9) (292, 41, 18) (293, 41, 63) (294, 42, 2) (295, 42, 4) (296, 42, 10) (297, 42, 19) (298, 42, 64) (299, 43, 1) (300, 43, 5) (301, 43, 25) (302, 43, 65) (303, 44, 2) (304, 44, 17) (305, 44, 19) (306, 44, 26) (307, 44, 66) (308, 45, 1) (309, 45, 8) (310, 45, 10) (311, 45, 23) (312, 45, 67) (313, 46, 2) (314, 46, 7) (315, 46, 11) (316, 46, 68)によって与えられ、
eと番号付けされた前記ゼロでない成分について、前記kはmod(Ve, Z)によって与えられるシフト係数によって定義され、Veは前記シフトベクトルにおけるe番目の成分を指しており、当該シフトベクトルは、
[307, 19, 50, 369, 181, 216, 317, 288, 109, 17, 357, 215, 106, 242, 180, 330, 346, 1, 0, 76, 76, 73, 288, 144, 331, 331, 178, 295, 342, 217, 99, 354, 114, 331, 112, 0, 0, 0, 205, 250, 328, 332, 256, 161, 267, 160, 63, 129, 200, 88, 53, 131, 240, 205, 13, 0, 0, 276, 87, 0, 275, 199, 153, 56, 132, 305, 231, 341, 212, 304, 300, 271, 39, 357, 1, 0, 332, 181, 0, 195, 14, 115, 166, 241, 51, 157, 0, 278, 257, 1, 351, 92, 253, 18, 225, 0, 9, 62, 316, 333, 290, 114, 0, 307, 179, 165, 18, 39, 224, 368, 67, 170, 0, 366, 232, 321, 133, 57, 303, 63, 82, 0, 101, 339, 274, 111, 383, 354, 0, 48, 102, 8, 47, 188, 334, 115, 0, 77, 186, 174, 232, 50, 74, 0, 313, 177, 266, 115, 370, 0, 142, 248, 137, 89, 347, 12, 0, 241, 2, 210, 318, 55, 269, 0, 13, 338, 57, 289, 57, 0, 260, 303, 81, 358, 375, 0, 130, 163, 280, 132, 4, 0, 145, 213, 344, 242, 197, 0, 187, 206, 264, 341, 59, 0, 205, 102, 328, 213, 97, 0, 30, 11, 233, 22, 0, 24, 89, 61, 27, 0, 298, 158, 235, 339, 234, 0, 72, 17, 383, 312, 0, 71, 81, 76, 136, 0, 194, 194, 101, 0, 222, 19, 244, 274, 0, 252, 5, 147, 78, 0, 159, 229, 260, 90, 0, 100, 215, 258, 256, 0, 102, 201, 175, 287, 0, 323, 8, 361, 105, 0, 230, 148, 202, 312, 0, 320, 335, 2, 266, 0, 210, 313, 297, 21, 0, 269, 82, 115, 0, 185, 177, 289, 214, 0, 258, 93, 346, 297, 0, 175, 37, 312, 0, 52, 314, 139, 288, 0, 113, 14, 218, 0, 113, 132, 114, 168, 0, 80, 78, 163, 274, 0, 135, 149, 15, 0]である、
無線送信機。 - プロセッシング回路(920、1020)を含む無線送信機(110、120)であって、前記プロセッシング回路(920、1020)は、
低密度パリティ検査、LDPC、符号のパリティ検査行列、PCM、を使用して情報ビットを符号化し、ここで、前記PCMは、サイズがZxZである正方部分行列に分割されており、基本行列とシフトベクトルとにより、jが0、1、2、3、4、および5のうちの1つであるシフトサイズZ = 7×2^jを使用して記述されており、
前記符号化された情報ビットを無線受信機(110、120)に送信するように動作可能であり、
前記基本行列は、各ZxZの部分行列について一つの成分を有しており、当該成分のうち、ゼロ行列である前記部分行列に対応するものは0であり、当該成分のうち、k個の成分だけ右に列を巡回的にシフトすることによりZxZの単位行列から得られる巡回置換行列である前記部分行列に対応するものは1であり、
前記基本行列は42x52のサイズを有し、当該基本行列においてゼロでない成分はトリプルズ(e, r, c)によって記述され、当該トリプルズ(e, r, c)は、eと番号付けされたゼロでない成分が前記基本行列における行r、列cに存在することを示すものであり、当該トリプルズは、
(1, 1, 1) (2, 1, 2) (3, 1, 3) (4, 1, 4) (5, 1, 7) (6, 1, 10) (7, 1, 11) (8, 1, 12) (9, 2, 1) (10, 2, 4) (11, 2, 5) (12, 2, 6) (13, 2, 7) (14, 2, 8) (15, 2, 9) (16, 2, 10) (17, 2, 12) (18, 2, 13) (19, 3, 1) (20, 3, 2) (21, 3, 4) (22, 3, 5) (23, 3, 9) (24, 3, 11) (25, 3, 13) (26, 3, 14) (27, 4, 2) (28, 4, 3) (29, 4, 5) (30, 4, 6) (31, 4, 7) (32, 4, 8) (33, 4, 9) (34, 4, 10) (35, 4, 11) (36, 4, 14) (37, 5, 1) (38, 5, 2) (39, 5, 12) (40, 5, 15) (41, 6, 1) (42, 6, 2) (43, 6, 6) (44, 6, 8) (45, 6, 12) (46, 6, 16) (47, 7, 1) (48, 7, 6) (49, 7, 8) (50, 7, 10) (51, 7, 12) (52, 7, 17) (53, 8, 2) (54, 8, 6) (55, 8, 8) (56, 8, 12) (57, 8, 14) (58, 8, 18) (59, 9, 1) (60, 9, 2) (61, 9, 13) (62, 9, 19) (63, 10, 2) (64, 10, 9) (65, 10, 11) (66, 10, 12) (67, 10, 20) (68, 11, 1) (69, 11, 2) (70, 11, 7) (71, 11, 8) (72, 11, 21) (73, 12, 1) (74, 12, 8) (75, 12, 10) (76, 12, 14) (77, 12, 22) (78, 13, 2) (79, 13, 4) (80, 13, 12) (81, 13, 23) (82, 14, 1) (83, 14, 2) (84, 14, 9) (85, 14, 14) (86, 14, 24) (87, 15, 2) (88, 15, 7) (89, 15, 12) (90, 15, 14) (91, 15, 25) (92, 16, 1) (93, 16, 11) (94, 16, 12) (95, 16, 26) (96, 17, 2) (97, 17, 10) (98, 17, 12) (99, 17, 13) (100, 17, 27) (101, 18, 2) (102, 18, 6) (103, 18, 12) (104, 18, 13) (105, 18, 28) (106, 19, 1) (107, 19, 7) (108, 19, 8) (109, 19, 29) (110, 20, 1) (111, 20, 2) (112, 20, 11) (113, 20, 30) (114, 21, 2) (115, 21, 5) (116, 21, 12) (117, 21, 31) (118, 22, 1) (119, 22, 9) (120, 22, 14) (121, 22, 32) (122, 23, 2) (123, 23, 3) (124, 23, 33) (125, 24, 1) (126, 24, 4) (127, 24, 6) (128, 24, 34) (129, 25, 2) (130, 25, 3) (131, 25, 10) (132, 25, 35) (133, 26, 1) (134, 26, 6) (135, 26, 36) (136, 27, 3) (137, 27, 8) (138, 27, 13) (139, 27, 14) (140, 27, 37) (141, 28, 1) (142, 28, 7) (143, 28, 38) (144, 29, 2) (145, 29, 3) (146, 29, 6) (147, 29, 39) (148, 30, 1) (149, 30, 5) (150, 30, 40) (151, 31, 3) (152, 31, 6) (153, 31, 8) (154, 31, 10) (155, 31, 41) (156, 32, 2) (157, 32, 14) (158, 32, 42) (159, 33, 1) (160, 33, 6) (161, 33, 13) (162, 33, 43) (163, 34, 3) (164, 34, 8) (165, 34, 11) (166, 34, 44) (167, 35, 1) (168, 35, 13) (169, 35, 14) (170, 35, 45) (171, 36, 2) (172, 36, 6) (173, 36, 12) (174, 36, 46) (175, 37, 1) (176, 37, 3) (177, 37, 8) (178, 37, 47) (179, 38, 11) (180, 38, 14) (181, 38, 48) (182, 39, 2) (183, 39, 6) (184, 39, 12) (185, 39, 49) (186, 40, 1) (187, 40, 8) (188, 40, 13) (189, 40, 50) (190, 41, 3) (191, 41, 11) (192, 41, 14) (193, 41, 51) (194, 42, 2) (195, 42, 6) (196, 42, 12) (197, 42, 52)によって与えられ、
eと番号付けされた前記ゼロでない成分について、前記kはmod(Ve, Z)によって与えられるシフト係数によって定義され、Veは前記シフトベクトルにおけるe番目の成分を指しており、当該シフトベクトルは、
[72, 110, 23, 181, 95, 8, 1, 0, 53, 156, 115, 156, 115, 200, 29, 31, 0, 0, 152, 131, 46, 191, 91, 0, 0, 0, 185, 6, 36, 124, 124, 110, 156, 133, 1, 0, 200, 16, 101, 0, 185, 138, 170, 219, 193, 0, 123, 55, 31, 222, 209, 0, 103, 13, 105, 150, 181, 0, 147, 43, 152, 0, 2, 30, 184, 83, 0, 174, 150, 8, 56, 0, 99, 138, 110, 99, 0, 46, 217, 109, 0, 37, 113, 143, 140, 0, 36, 95, 40, 116, 0, 116, 200, 110, 0, 75, 158, 134, 97, 0, 48, 132, 206, 2, 0, 68, 16, 156, 0, 35, 138, 86, 0, 6, 20, 141, 0, 80, 43, 81, 0, 49, 1, 0, 156, 54, 134, 0, 153, 88, 63, 0, 211, 94, 0, 90, 6, 221, 6, 0, 27, 118, 0, 216, 212, 193, 0, 108, 61, 0, 106, 44, 185, 176, 0, 147, 182, 0, 108, 21, 110, 0, 71, 12, 109, 0, 29, 201, 69, 0, 91, 165, 55, 0, 1, 175, 83, 0, 40, 12, 0, 37, 97, 46, 0, 106, 181, 154, 0, 98, 35, 36, 0, 120, 101, 81, 0]である、
無線送信機。 - 請求項1または2に記載の無線送信機(110、120)であって、
前記無線送信機(110、120)は、ネットワークノードである、無線送信機。 - 請求項1または2に記載の無線送信機(110、120)であって、
前記無線送信機(110、120)は、無線デバイスである、無線送信機。 - プロセッシング回路(920、1020)を含む無線受信機(110、120)であって、前記プロセッシング回路(920、1020)は、
無線送信機(110、120)から符号化された情報ビットを受信し、
低密度パリティ検査、LDPC、符号のパリティ検査行列、PCM、を使用して前記情報ビットを復号するように動作し、ここで、前記PCMは、サイズがZxZである正方部分行列に分割されており、基本行列とシフトベクトルとにより、jが0、1、2、3、4、5、6および7のうちの1つであるシフトサイズZ = 3×2^jを使用して記述されており、
前記基本行列は、各ZxZの部分行列について一つの成分を有しており、当該成分のうち、ゼロ行列である前記部分行列に対応するものは0であり、当該成分のうち、k個の成分だけ右に列を巡回的にシフトすることによりZxZの単位行列から得られる巡回置換行列である前記部分行列に対応するものは1であり、
前記基本行列は46x68のサイズを有し、当該基本行列においてゼロでない成分はトリプルズ(e, r, c)によって記述され、当該トリプルズ(e, r, c)は、eと番号付けされたゼロでない成分が前記基本行列における行r、列cに存在することを示すものであり、当該トリプルズは、
(1, 1, 1) (2, 1, 2) (3, 1, 3) (4, 1, 4) (5, 1, 6) (6, 1, 7) (7, 1, 10) (8, 1, 11) (9, 1, 12) (10, 1, 13) (11, 1, 14) (12, 1, 16) (13, 1, 17) (14, 1, 19) (15, 1, 20) (16, 1, 21) (17, 1, 22) (18, 1, 23) (19, 1, 24) (20, 2, 1) (21, 2, 3) (22, 2, 4) (23, 2, 5) (24, 2, 6) (25, 2, 8) (26, 2, 9) (27, 2, 10) (28, 2, 12) (29, 2, 13) (30, 2, 15) (31, 2, 16) (32, 2, 17) (33, 2, 18) (34, 2, 20) (35, 2, 22) (36, 2, 23) (37, 2, 24) (38, 2, 25) (39, 3, 1) (40, 3, 2) (41, 3, 3) (42, 3, 5) (43, 3, 6) (44, 3, 7) (45, 3, 8) (46, 3, 9) (47, 3, 10) (48, 3, 11) (49, 3, 14) (50, 3, 15) (51, 3, 16) (52, 3, 18) (53, 3, 19) (54, 3, 20) (55, 3, 21) (56, 3, 25) (57, 3, 26) (58, 4, 1) (59, 4, 2) (60, 4, 4) (61, 4, 5) (62, 4, 7) (63, 4, 8) (64, 4, 9) (65, 4, 11) (66, 4, 12) (67, 4, 13) (68, 4, 14) (69, 4, 15) (70, 4, 17) (71, 4, 18) (72, 4, 19) (73, 4, 21) (74, 4, 22) (75, 4, 23) (76, 4, 26) (77, 5, 1) (78, 5, 2) (79, 5, 27) (80, 6, 1) (81, 6, 2) (82, 6, 4) (83, 6, 13) (84, 6, 17) (85, 6, 22) (86, 6, 23) (87, 6, 28) (88, 7, 1) (89, 7, 7) (90, 7, 11) (91, 7, 12) (92, 7, 14) (93, 7, 18) (94, 7, 19) (95, 7, 21) (96, 7, 29) (97, 8, 1) (98, 8, 2) (99, 8, 5) (100, 8, 8) (101, 8, 9) (102, 8, 15) (103, 8, 30) (104, 9, 1) (105, 9, 2) (106, 9, 4) (107, 9, 13) (108, 9, 17) (109, 9, 20) (110, 9, 22) (111, 9, 23) (112, 9, 25) (113, 9, 31) (114, 10, 1) (115, 10, 2) (116, 10, 11) (117, 10, 12) (118, 10, 14) (119, 10, 18) (120, 10, 19) (121, 10, 21) (122, 10, 32) (123, 11, 2) (124, 11, 3) (125, 11, 5) (126, 11, 8) (127, 11, 9) (128, 11, 15) (129, 11, 33) (130, 12, 1) (131, 12, 2) (132, 12, 13) (133, 12, 17) (134, 12, 22) (135, 12, 23) (136, 12, 24) (137, 12, 34) (138, 13, 1) (139, 13, 2) (140, 13, 11) (141, 13, 12) (142, 13, 14) (143, 13, 19) (144, 13, 35) (145, 14, 1) (146, 14, 4) (147, 14, 8) (148, 14, 21) (149, 14, 24) (150, 14, 36) (151, 15, 1) (152, 15, 13) (153, 15, 16) (154, 15, 17) (155, 15, 18) (156, 15, 22) (157, 15, 37) (158, 16, 1) (159, 16, 2) (160, 16, 11) (161, 16, 14) (162, 16, 19) (163, 16, 26) (164, 16, 38) (165, 17, 2) (166, 17, 4) (167, 17, 12) (168, 17, 21) (169, 17, 23) (170, 17, 39) (171, 18, 1) (172, 18, 15) (173, 18, 17) (174, 18, 18) (175, 18, 22) (176, 18, 40) (177, 19, 2) (178, 19, 13) (179, 19, 14) (180, 19, 19) (181, 19, 20) (182, 19, 41) (183, 20, 1) (184, 20, 2) (185, 20, 8) (186, 20, 9) (187, 20, 11) (188, 20, 42) (189, 21, 1) (190, 21, 4) (191, 21, 10) (192, 21, 12) (193, 21, 23) (194, 21, 43) (195, 22, 2) (196, 22, 6) (197, 22, 17) (198, 22, 21) (199, 22, 22) (200, 22, 44) (201, 23, 1) (202, 23, 13) (203, 23, 14) (204, 23, 18) (205, 23, 45) (206, 24, 2) (207, 24, 3) (208, 24, 11) (209, 24, 19) (210, 24, 46) (211, 25, 1) (212, 25, 4) (213, 25, 5) (214, 25, 12) (215, 25, 23) (216, 25, 47) (217, 26, 2) (218, 26, 7) (219, 26, 8) (220, 26, 15) (221, 26, 48) (222, 27, 1) (223, 27, 3) (224, 27, 5) (225, 27, 16) (226, 27, 49) (227, 28, 2) (228, 28, 7) (229, 28, 9) (230, 28, 50) (231, 29, 1) (232, 29, 5) (233, 29, 20) (234, 29, 22) (235, 29, 51) (236, 30, 2) (237, 30, 15) (238, 30, 19) (239, 30, 26) (240, 30, 52) (241, 31, 1) (242, 31, 11) (243, 31, 14) (244, 31, 25) (245, 31, 53) (246, 32, 2) (247, 32, 8) (248, 32, 23) (249, 32, 26) (250, 32, 54) (251, 33, 1) (252, 33, 13) (253, 33, 15) (254, 33, 25) (255, 33, 55) (256, 34, 2) (257, 34, 3) (258, 34, 12) (259, 34, 22) (260, 34, 56) (261, 35, 1) (262, 35, 8) (263, 35, 16) (264, 35, 18) (265, 35, 57) (266, 36, 2) (267, 36, 7) (268, 36, 13) (269, 36, 23) (270, 36, 58) (271, 37, 1) (272, 37, 15) (273, 37, 16) (274, 37, 19) (275, 37, 59) (276, 38, 2) (277, 38, 14) (278, 38, 24) (279, 38, 60) (280, 39, 1) (281, 39, 10) (282, 39, 11) (283, 39, 13) (284, 39, 61) (285, 40, 2) (286, 40, 4) (287, 40, 8) (288, 40, 20) (289, 40, 62) (290, 41, 1) (291, 41, 9) (292, 41, 18) (293, 41, 63) (294, 42, 2) (295, 42, 4) (296, 42, 10) (297, 42, 19) (298, 42, 64) (299, 43, 1) (300, 43, 5) (301, 43, 25) (302, 43, 65) (303, 44, 2) (304, 44, 17) (305, 44, 19) (306, 44, 26) (307, 44, 66) (308, 45, 1) (309, 45, 8) (310, 45, 10) (311, 45, 23) (312, 45, 67) (313, 46, 2) (314, 46, 7) (315, 46, 11) (316, 46, 68)によって与えられ、
eと番号付けされた前記ゼロでない成分について、前記kはmod(Ve, Z)によって与えられるシフト係数によって定義され、Veは前記シフトベクトルにおけるe番目の成分を指しており、当該シフトベクトルは、
[307, 19, 50, 369, 181, 216, 317, 288, 109, 17, 357, 215, 106, 242, 180, 330, 346, 1, 0, 76, 76, 73, 288, 144, 331, 331, 178, 295, 342, 217, 99, 354, 114, 331, 112, 0, 0, 0, 205, 250, 328, 332, 256, 161, 267, 160, 63, 129, 200, 88, 53, 131, 240, 205, 13, 0, 0, 276, 87, 0, 275, 199, 153, 56, 132, 305, 231, 341, 212, 304, 300, 271, 39, 357, 1, 0, 332, 181, 0, 195, 14, 115, 166, 241, 51, 157, 0, 278, 257, 1, 351, 92, 253, 18, 225, 0, 9, 62, 316, 333, 290, 114, 0, 307, 179, 165, 18, 39, 224, 368, 67, 170, 0, 366, 232, 321, 133, 57, 303, 63, 82, 0, 101, 339, 274, 111, 383, 354, 0, 48, 102, 8, 47, 188, 334, 115, 0, 77, 186, 174, 232, 50, 74, 0, 313, 177, 266, 115, 370, 0, 142, 248, 137, 89, 347, 12, 0, 241, 2, 210, 318, 55, 269, 0, 13, 338, 57, 289, 57, 0, 260, 303, 81, 358, 375, 0, 130, 163, 280, 132, 4, 0, 145, 213, 344, 242, 197, 0, 187, 206, 264, 341, 59, 0, 205, 102, 328, 213, 97, 0, 30, 11, 233, 22, 0, 24, 89, 61, 27, 0, 298, 158, 235, 339, 234, 0, 72, 17, 383, 312, 0, 71, 81, 76, 136, 0, 194, 194, 101, 0, 222, 19, 244, 274, 0, 252, 5, 147, 78, 0, 159, 229, 260, 90, 0, 100, 215, 258, 256, 0, 102, 201, 175, 287, 0, 323, 8, 361, 105, 0, 230, 148, 202, 312, 0, 320, 335, 2, 266, 0, 210, 313, 297, 21, 0, 269, 82, 115, 0, 185, 177, 289, 214, 0, 258, 93, 346, 297, 0, 175, 37, 312, 0, 52, 314, 139, 288, 0, 113, 14, 218, 0, 113, 132, 114, 168, 0, 80, 78, 163, 274, 0, 135, 149, 15, 0]である、
無線受信機。 - プロセッシング回路(920、1020)を含む無線受信機(110、120)であって、前記プロセッシング回路(920、1020)は、
無線送信機(110、120)から符号化された情報ビットを受信し、
低密度パリティ検査、LDPC、符号のパリティ検査行列、PCM、を使用して前記情報ビットを復号するように動作し、ここで、前記PCMは、サイズがZxZである正方部分行列に分割されており、基本行列とシフトベクトルとにより、jが0、1、2、3、4、および5のうちの1つであるシフトサイズZ = 7×2^jを使用して記述されており、
前記基本行列は、各ZxZの部分行列について一つの成分を有しており、当該成分のうち、ゼロ行列である前記部分行列に対応するものは0であり、当該成分のうち、k個の成分だけ右に列を巡回的にシフトすることによりZxZの単位行列から得られる巡回置換行列である前記部分行列に対応するものは1であり、
前記基本行列は42x52のサイズを有し、当該基本行列においてゼロでない成分はトリプルズ(e, r, c)によって記述され、当該トリプルズ(e, r, c)は、eと番号付けされたゼロでない成分が前記基本行列における行r、列cに存在することを示すものであり、当該トリプルズは、
(1, 1, 1) (2, 1, 2) (3, 1, 3) (4, 1, 4) (5, 1, 7) (6, 1, 10) (7, 1, 11) (8, 1, 12) (9, 2, 1) (10, 2, 4) (11, 2, 5) (12, 2, 6) (13, 2, 7) (14, 2, 8) (15, 2, 9) (16, 2, 10) (17, 2, 12) (18, 2, 13) (19, 3, 1) (20, 3, 2) (21, 3, 4) (22, 3, 5) (23, 3, 9) (24, 3, 11) (25, 3, 13) (26, 3, 14) (27, 4, 2) (28, 4, 3) (29, 4, 5) (30, 4, 6) (31, 4, 7) (32, 4, 8) (33, 4, 9) (34, 4, 10) (35, 4, 11) (36, 4, 14) (37, 5, 1) (38, 5, 2) (39, 5, 12) (40, 5, 15) (41, 6, 1) (42, 6, 2) (43, 6, 6) (44, 6, 8) (45, 6, 12) (46, 6, 16) (47, 7, 1) (48, 7, 6) (49, 7, 8) (50, 7, 10) (51, 7, 12) (52, 7, 17) (53, 8, 2) (54, 8, 6) (55, 8, 8) (56, 8, 12) (57, 8, 14) (58, 8, 18) (59, 9, 1) (60, 9, 2) (61, 9, 13) (62, 9, 19) (63, 10, 2) (64, 10, 9) (65, 10, 11) (66, 10, 12) (67, 10, 20) (68, 11, 1) (69, 11, 2) (70, 11, 7) (71, 11, 8) (72, 11, 21) (73, 12, 1) (74, 12, 8) (75, 12, 10) (76, 12, 14) (77, 12, 22) (78, 13, 2) (79, 13, 4) (80, 13, 12) (81, 13, 23) (82, 14, 1) (83, 14, 2) (84, 14, 9) (85, 14, 14) (86, 14, 24) (87, 15, 2) (88, 15, 7) (89, 15, 12) (90, 15, 14) (91, 15, 25) (92, 16, 1) (93, 16, 11) (94, 16, 12) (95, 16, 26) (96, 17, 2) (97, 17, 10) (98, 17, 12) (99, 17, 13) (100, 17, 27) (101, 18, 2) (102, 18, 6) (103, 18, 12) (104, 18, 13) (105, 18, 28) (106, 19, 1) (107, 19, 7) (108, 19, 8) (109, 19, 29) (110, 20, 1) (111, 20, 2) (112, 20, 11) (113, 20, 30) (114, 21, 2) (115, 21, 5) (116, 21, 12) (117, 21, 31) (118, 22, 1) (119, 22, 9) (120, 22, 14) (121, 22, 32) (122, 23, 2) (123, 23, 3) (124, 23, 33) (125, 24, 1) (126, 24, 4) (127, 24, 6) (128, 24, 34) (129, 25, 2) (130, 25, 3) (131, 25, 10) (132, 25, 35) (133, 26, 1) (134, 26, 6) (135, 26, 36) (136, 27, 3) (137, 27, 8) (138, 27, 13) (139, 27, 14) (140, 27, 37) (141, 28, 1) (142, 28, 7) (143, 28, 38) (144, 29, 2) (145, 29, 3) (146, 29, 6) (147, 29, 39) (148, 30, 1) (149, 30, 5) (150, 30, 40) (151, 31, 3) (152, 31, 6) (153, 31, 8) (154, 31, 10) (155, 31, 41) (156, 32, 2) (157, 32, 14) (158, 32, 42) (159, 33, 1) (160, 33, 6) (161, 33, 13) (162, 33, 43) (163, 34, 3) (164, 34, 8) (165, 34, 11) (166, 34, 44) (167, 35, 1) (168, 35, 13) (169, 35, 14) (170, 35, 45) (171, 36, 2) (172, 36, 6) (173, 36, 12) (174, 36, 46) (175, 37, 1) (176, 37, 3) (177, 37, 8) (178, 37, 47) (179, 38, 11) (180, 38, 14) (181, 38, 48) (182, 39, 2) (183, 39, 6) (184, 39, 12) (185, 39, 49) (186, 40, 1) (187, 40, 8) (188, 40, 13) (189, 40, 50) (190, 41, 3) (191, 41, 11) (192, 41, 14) (193, 41, 51) (194, 42, 2) (195, 42, 6) (196, 42, 12) (197, 42, 52)によって与えられ、
eと番号付けされた前記ゼロでない成分について、前記kはmod(Ve, Z)によって与えられるシフト係数によって定義され、Veは前記シフトベクトルにおけるe番目の成分を指しており、当該シフトベクトルは、
[72, 110, 23, 181, 95, 8, 1, 0, 53, 156, 115, 156, 115, 200, 29, 31, 0, 0, 152, 131, 46, 191, 91, 0, 0, 0, 185, 6, 36, 124, 124, 110, 156, 133, 1, 0, 200, 16, 101, 0, 185, 138, 170, 219, 193, 0, 123, 55, 31, 222, 209, 0, 103, 13, 105, 150, 181, 0, 147, 43, 152, 0, 2, 30, 184, 83, 0, 174, 150, 8, 56, 0, 99, 138, 110, 99, 0, 46, 217, 109, 0, 37, 113, 143, 140, 0, 36, 95, 40, 116, 0, 116, 200, 110, 0, 75, 158, 134, 97, 0, 48, 132, 206, 2, 0, 68, 16, 156, 0, 35, 138, 86, 0, 6, 20, 141, 0, 80, 43, 81, 0, 49, 1, 0, 156, 54, 134, 0, 153, 88, 63, 0, 211, 94, 0, 90, 6, 221, 6, 0, 27, 118, 0, 216, 212, 193, 0, 108, 61, 0, 106, 44, 185, 176, 0, 147, 182, 0, 108, 21, 110, 0, 71, 12, 109, 0, 29, 201, 69, 0, 91, 165, 55, 0, 1, 175, 83, 0, 40, 12, 0, 37, 97, 46, 0, 106, 181, 154, 0, 98, 35, 36, 0, 120, 101, 81, 0]である、
無線受信機。 - 請求項5または6に記載の無線受信機(110、120)であって、
前記無線受信機(110、120)は、ネットワークノードである、無線受信機。 - 請求項5または6に記載の無線受信機(110、120)であって、
前記無線受信機(110、120)は、無線デバイスである、無線受信機。 - 無線通信ネットワークの無線送信機において使用するための方法であって、前記方法は、
低密度パリティ検査、LDPC、符号のパリティ検査行列、PCM、を使用して情報ビットを符号化することであって、ここで、前記PCMは、サイズがZxZである正方部分行列に分割されており、基本行列とシフトベクトルとにより、jが0、1、2、3、4、5、6および7のうちの1つであるシフトサイズZ = 3×2^jを使用して記述されている、こと(212)と、
前記符号化された情報ビットを無線受信機(110、120)に送信すること(214)と、を有し、
前記基本行列は、各ZxZの部分行列について一つの成分を有しており、当該成分のうち、ゼロ行列である前記部分行列に対応するものは0であり、当該成分のうち、k個の成分だけ右に列を巡回的にシフトすることによりZxZの単位行列から得られる巡回置換行列である前記部分行列に対応するものは1であり、
前記基本行列は46x68のサイズを有し、当該基本行列においてゼロでない成分はトリプルズ(e, r, c)によって記述され、当該トリプルズ(e, r, c)は、eと番号付けされたゼロでない成分が前記基本行列における行r、列cに存在することを示すものであり、当該トリプルズは、
(1, 1, 1) (2, 1, 2) (3, 1, 3) (4, 1, 4) (5, 1, 6) (6, 1, 7) (7, 1, 10) (8, 1, 11) (9, 1, 12) (10, 1, 13) (11, 1, 14) (12, 1, 16) (13, 1, 17) (14, 1, 19) (15, 1, 20) (16, 1, 21) (17, 1, 22) (18, 1, 23) (19, 1, 24) (20, 2, 1) (21, 2, 3) (22, 2, 4) (23, 2, 5) (24, 2, 6) (25, 2, 8) (26, 2, 9) (27, 2, 10) (28, 2, 12) (29, 2, 13) (30, 2, 15) (31, 2, 16) (32, 2, 17) (33, 2, 18) (34, 2, 20) (35, 2, 22) (36, 2, 23) (37, 2, 24) (38, 2, 25) (39, 3, 1) (40, 3, 2) (41, 3, 3) (42, 3, 5) (43, 3, 6) (44, 3, 7) (45, 3, 8) (46, 3, 9) (47, 3, 10) (48, 3, 11) (49, 3, 14) (50, 3, 15) (51, 3, 16) (52, 3, 18) (53, 3, 19) (54, 3, 20) (55, 3, 21) (56, 3, 25) (57, 3, 26) (58, 4, 1) (59, 4, 2) (60, 4, 4) (61, 4, 5) (62, 4, 7) (63, 4, 8) (64, 4, 9) (65, 4, 11) (66, 4, 12) (67, 4, 13) (68, 4, 14) (69, 4, 15) (70, 4, 17) (71, 4, 18) (72, 4, 19) (73, 4, 21) (74, 4, 22) (75, 4, 23) (76, 4, 26) (77, 5, 1) (78, 5, 2) (79, 5, 27) (80, 6, 1) (81, 6, 2) (82, 6, 4) (83, 6, 13) (84, 6, 17) (85, 6, 22) (86, 6, 23) (87, 6, 28) (88, 7, 1) (89, 7, 7) (90, 7, 11) (91, 7, 12) (92, 7, 14) (93, 7, 18) (94, 7, 19) (95, 7, 21) (96, 7, 29) (97, 8, 1) (98, 8, 2) (99, 8, 5) (100, 8, 8) (101, 8, 9) (102, 8, 15) (103, 8, 30) (104, 9, 1) (105, 9, 2) (106, 9, 4) (107, 9, 13) (108, 9, 17) (109, 9, 20) (110, 9, 22) (111, 9, 23) (112, 9, 25) (113, 9, 31) (114, 10, 1) (115, 10, 2) (116, 10, 11) (117, 10, 12) (118, 10, 14) (119, 10, 18) (120, 10, 19) (121, 10, 21) (122, 10, 32) (123, 11, 2) (124, 11, 3) (125, 11, 5) (126, 11, 8) (127, 11, 9) (128, 11, 15) (129, 11, 33) (130, 12, 1) (131, 12, 2) (132, 12, 13) (133, 12, 17) (134, 12, 22) (135, 12, 23) (136, 12, 24) (137, 12, 34) (138, 13, 1) (139, 13, 2) (140, 13, 11) (141, 13, 12) (142, 13, 14) (143, 13, 19) (144, 13, 35) (145, 14, 1) (146, 14, 4) (147, 14, 8) (148, 14, 21) (149, 14, 24) (150, 14, 36) (151, 15, 1) (152, 15, 13) (153, 15, 16) (154, 15, 17) (155, 15, 18) (156, 15, 22) (157, 15, 37) (158, 16, 1) (159, 16, 2) (160, 16, 11) (161, 16, 14) (162, 16, 19) (163, 16, 26) (164, 16, 38) (165, 17, 2) (166, 17, 4) (167, 17, 12) (168, 17, 21) (169, 17, 23) (170, 17, 39) (171, 18, 1) (172, 18, 15) (173, 18, 17) (174, 18, 18) (175, 18, 22) (176, 18, 40) (177, 19, 2) (178, 19, 13) (179, 19, 14) (180, 19, 19) (181, 19, 20) (182, 19, 41) (183, 20, 1) (184, 20, 2) (185, 20, 8) (186, 20, 9) (187, 20, 11) (188, 20, 42) (189, 21, 1) (190, 21, 4) (191, 21, 10) (192, 21, 12) (193, 21, 23) (194, 21, 43) (195, 22, 2) (196, 22, 6) (197, 22, 17) (198, 22, 21) (199, 22, 22) (200, 22, 44) (201, 23, 1) (202, 23, 13) (203, 23, 14) (204, 23, 18) (205, 23, 45) (206, 24, 2) (207, 24, 3) (208, 24, 11) (209, 24, 19) (210, 24, 46) (211, 25, 1) (212, 25, 4) (213, 25, 5) (214, 25, 12) (215, 25, 23) (216, 25, 47) (217, 26, 2) (218, 26, 7) (219, 26, 8) (220, 26, 15) (221, 26, 48) (222, 27, 1) (223, 27, 3) (224, 27, 5) (225, 27, 16) (226, 27, 49) (227, 28, 2) (228, 28, 7) (229, 28, 9) (230, 28, 50) (231, 29, 1) (232, 29, 5) (233, 29, 20) (234, 29, 22) (235, 29, 51) (236, 30, 2) (237, 30, 15) (238, 30, 19) (239, 30, 26) (240, 30, 52) (241, 31, 1) (242, 31, 11) (243, 31, 14) (244, 31, 25) (245, 31, 53) (246, 32, 2) (247, 32, 8) (248, 32, 23) (249, 32, 26) (250, 32, 54) (251, 33, 1) (252, 33, 13) (253, 33, 15) (254, 33, 25) (255, 33, 55) (256, 34, 2) (257, 34, 3) (258, 34, 12) (259, 34, 22) (260, 34, 56) (261, 35, 1) (262, 35, 8) (263, 35, 16) (264, 35, 18) (265, 35, 57) (266, 36, 2) (267, 36, 7) (268, 36, 13) (269, 36, 23) (270, 36, 58) (271, 37, 1) (272, 37, 15) (273, 37, 16) (274, 37, 19) (275, 37, 59) (276, 38, 2) (277, 38, 14) (278, 38, 24) (279, 38, 60) (280, 39, 1) (281, 39, 10) (282, 39, 11) (283, 39, 13) (284, 39, 61) (285, 40, 2) (286, 40, 4) (287, 40, 8) (288, 40, 20) (289, 40, 62) (290, 41, 1) (291, 41, 9) (292, 41, 18) (293, 41, 63) (294, 42, 2) (295, 42, 4) (296, 42, 10) (297, 42, 19) (298, 42, 64) (299, 43, 1) (300, 43, 5) (301, 43, 25) (302, 43, 65) (303, 44, 2) (304, 44, 17) (305, 44, 19) (306, 44, 26) (307, 44, 66) (308, 45, 1) (309, 45, 8) (310, 45, 10) (311, 45, 23) (312, 45, 67) (313, 46, 2) (314, 46, 7) (315, 46, 11) (316, 46, 68)によって与えられ、
eと番号付けされた前記ゼロでない成分について、前記kはmod(Ve, Z)によって与えられるシフト係数によって定義され、Veは前記シフトベクトルにおけるe番目の成分を指しており、当該シフトベクトルは、
[307, 19, 50, 369, 181, 216, 317, 288, 109, 17, 357, 215, 106, 242, 180, 330, 346, 1, 0, 76, 76, 73, 288, 144, 331, 331, 178, 295, 342, 217, 99, 354, 114, 331, 112, 0, 0, 0, 205, 250, 328, 332, 256, 161, 267, 160, 63, 129, 200, 88, 53, 131, 240, 205, 13, 0, 0, 276, 87, 0, 275, 199, 153, 56, 132, 305, 231, 341, 212, 304, 300, 271, 39, 357, 1, 0, 332, 181, 0, 195, 14, 115, 166, 241, 51, 157, 0, 278, 257, 1, 351, 92, 253, 18, 225, 0, 9, 62, 316, 333, 290, 114, 0, 307, 179, 165, 18, 39, 224, 368, 67, 170, 0, 366, 232, 321, 133, 57, 303, 63, 82, 0, 101, 339, 274, 111, 383, 354, 0, 48, 102, 8, 47, 188, 334, 115, 0, 77, 186, 174, 232, 50, 74, 0, 313, 177, 266, 115, 370, 0, 142, 248, 137, 89, 347, 12, 0, 241, 2, 210, 318, 55, 269, 0, 13, 338, 57, 289, 57, 0, 260, 303, 81, 358, 375, 0, 130, 163, 280, 132, 4, 0, 145, 213, 344, 242, 197, 0, 187, 206, 264, 341, 59, 0, 205, 102, 328, 213, 97, 0, 30, 11, 233, 22, 0, 24, 89, 61, 27, 0, 298, 158, 235, 339, 234, 0, 72, 17, 383, 312, 0, 71, 81, 76, 136, 0, 194, 194, 101, 0, 222, 19, 244, 274, 0, 252, 5, 147, 78, 0, 159, 229, 260, 90, 0, 100, 215, 258, 256, 0, 102, 201, 175, 287, 0, 323, 8, 361, 105, 0, 230, 148, 202, 312, 0, 320, 335, 2, 266, 0, 210, 313, 297, 21, 0, 269, 82, 115, 0, 185, 177, 289, 214, 0, 258, 93, 346, 297, 0, 175, 37, 312, 0, 52, 314, 139, 288, 0, 113, 14, 218, 0, 113, 132, 114, 168, 0, 80, 78, 163, 274, 0, 135, 149, 15, 0]である、
方法。 - 無線通信ネットワークの無線送信機において使用するための方法であって、前記方法は、
低密度パリティ検査、LDPC、符号のパリティ検査行列、PCM、を使用して情報ビットを符号化することであって、ここで、前記PCMは、サイズがZxZである正方部分行列に分割されており、基本行列とシフトベクトルとにより、jが0、1、2、3、4、および5のうちの1つであるシフトサイズZ = 7×2^jを使用して記述されている、こと(212)と、
前記符号化された情報ビットを無線受信機(110、120)に送信すること(214)と、を有し、
前記基本行列は、各ZxZの部分行列について一つの成分を有しており、当該成分のうち、ゼロ行列である前記部分行列に対応するものは0であり、当該成分のうち、k個の成分だけ右に列を巡回的にシフトすることによりZxZの単位行列から得られる巡回置換行列である前記部分行列に対応するものは1であり、
前記基本行列は42x52のサイズを有し、当該基本行列においてゼロでない成分はトリプルズ(e, r, c)によって記述され、当該トリプルズ(e, r, c)は、eと番号付けされたゼロでない成分が前記基本行列における行r、列cに存在することを示すものであり、当該トリプルズは、
(1, 1, 1) (2, 1, 2) (3, 1, 3) (4, 1, 4) (5, 1, 7) (6, 1, 10) (7, 1, 11) (8, 1, 12) (9, 2, 1) (10, 2, 4) (11, 2, 5) (12, 2, 6) (13, 2, 7) (14, 2, 8) (15, 2, 9) (16, 2, 10) (17, 2, 12) (18, 2, 13) (19, 3, 1) (20, 3, 2) (21, 3, 4) (22, 3, 5) (23, 3, 9) (24, 3, 11) (25, 3, 13) (26, 3, 14) (27, 4, 2) (28, 4, 3) (29, 4, 5) (30, 4, 6) (31, 4, 7) (32, 4, 8) (33, 4, 9) (34, 4, 10) (35, 4, 11) (36, 4, 14) (37, 5, 1) (38, 5, 2) (39, 5, 12) (40, 5, 15) (41, 6, 1) (42, 6, 2) (43, 6, 6) (44, 6, 8) (45, 6, 12) (46, 6, 16) (47, 7, 1) (48, 7, 6) (49, 7, 8) (50, 7, 10) (51, 7, 12) (52, 7, 17) (53, 8, 2) (54, 8, 6) (55, 8, 8) (56, 8, 12) (57, 8, 14) (58, 8, 18) (59, 9, 1) (60, 9, 2) (61, 9, 13) (62, 9, 19) (63, 10, 2) (64, 10, 9) (65, 10, 11) (66, 10, 12) (67, 10, 20) (68, 11, 1) (69, 11, 2) (70, 11, 7) (71, 11, 8) (72, 11, 21) (73, 12, 1) (74, 12, 8) (75, 12, 10) (76, 12, 14) (77, 12, 22) (78, 13, 2) (79, 13, 4) (80, 13, 12) (81, 13, 23) (82, 14, 1) (83, 14, 2) (84, 14, 9) (85, 14, 14) (86, 14, 24) (87, 15, 2) (88, 15, 7) (89, 15, 12) (90, 15, 14) (91, 15, 25) (92, 16, 1) (93, 16, 11) (94, 16, 12) (95, 16, 26) (96, 17, 2) (97, 17, 10) (98, 17, 12) (99, 17, 13) (100, 17, 27) (101, 18, 2) (102, 18, 6) (103, 18, 12) (104, 18, 13) (105, 18, 28) (106, 19, 1) (107, 19, 7) (108, 19, 8) (109, 19, 29) (110, 20, 1) (111, 20, 2) (112, 20, 11) (113, 20, 30) (114, 21, 2) (115, 21, 5) (116, 21, 12) (117, 21, 31) (118, 22, 1) (119, 22, 9) (120, 22, 14) (121, 22, 32) (122, 23, 2) (123, 23, 3) (124, 23, 33) (125, 24, 1) (126, 24, 4) (127, 24, 6) (128, 24, 34) (129, 25, 2) (130, 25, 3) (131, 25, 10) (132, 25, 35) (133, 26, 1) (134, 26, 6) (135, 26, 36) (136, 27, 3) (137, 27, 8) (138, 27, 13) (139, 27, 14) (140, 27, 37) (141, 28, 1) (142, 28, 7) (143, 28, 38) (144, 29, 2) (145, 29, 3) (146, 29, 6) (147, 29, 39) (148, 30, 1) (149, 30, 5) (150, 30, 40) (151, 31, 3) (152, 31, 6) (153, 31, 8) (154, 31, 10) (155, 31, 41) (156, 32, 2) (157, 32, 14) (158, 32, 42) (159, 33, 1) (160, 33, 6) (161, 33, 13) (162, 33, 43) (163, 34, 3) (164, 34, 8) (165, 34, 11) (166, 34, 44) (167, 35, 1) (168, 35, 13) (169, 35, 14) (170, 35, 45) (171, 36, 2) (172, 36, 6) (173, 36, 12) (174, 36, 46) (175, 37, 1) (176, 37, 3) (177, 37, 8) (178, 37, 47) (179, 38, 11) (180, 38, 14) (181, 38, 48) (182, 39, 2) (183, 39, 6) (184, 39, 12) (185, 39, 49) (186, 40, 1) (187, 40, 8) (188, 40, 13) (189, 40, 50) (190, 41, 3) (191, 41, 11) (192, 41, 14) (193, 41, 51) (194, 42, 2) (195, 42, 6) (196, 42, 12) (197, 42, 52)によって与えられ、
eと番号付けされた前記ゼロでない成分について、前記kはmod(Ve, Z)によって与えられるシフト係数によって定義され、Veは前記シフトベクトルにおけるe番目の成分を指しており、当該シフトベクトルは、
[72, 110, 23, 181, 95, 8, 1, 0, 53, 156, 115, 156, 115, 200, 29, 31, 0, 0, 152, 131, 46, 191, 91, 0, 0, 0, 185, 6, 36, 124, 124, 110, 156, 133, 1, 0, 200, 16, 101, 0, 185, 138, 170, 219, 193, 0, 123, 55, 31, 222, 209, 0, 103, 13, 105, 150, 181, 0, 147, 43, 152, 0, 2, 30, 184, 83, 0, 174, 150, 8, 56, 0, 99, 138, 110, 99, 0, 46, 217, 109, 0, 37, 113, 143, 140, 0, 36, 95, 40, 116, 0, 116, 200, 110, 0, 75, 158, 134, 97, 0, 48, 132, 206, 2, 0, 68, 16, 156, 0, 35, 138, 86, 0, 6, 20, 141, 0, 80, 43, 81, 0, 49, 1, 0, 156, 54, 134, 0, 153, 88, 63, 0, 211, 94, 0, 90, 6, 221, 6, 0, 27, 118, 0, 216, 212, 193, 0, 108, 61, 0, 106, 44, 185, 176, 0, 147, 182, 0, 108, 21, 110, 0, 71, 12, 109, 0, 29, 201, 69, 0, 91, 165, 55, 0, 1, 175, 83, 0, 40, 12, 0, 37, 97, 46, 0, 106, 181, 154, 0, 98, 35, 36, 0, 120, 101, 81, 0]である、
方法。 - 請求項9または10に記載の方法であって、
前記無線送信機(110,120)は、ネットワークノードである、方法。 - 請求項9または10に記載の方法であって、
前記無線送信機(110,120)は、無線デバイスである、方法。 - 無線通信ネットワークの無線受信機において使用するための方法であって、前記方法は、
無線送信機から符号化された情報ビットを受信すること(312)と、
低密度パリティ検査、LDPC、符号のパリティ検査行列、PCM、を使用して前記情報ビットを復号すること(314)と、を有し、ここで、前記PCMは、サイズがZxZである正方部分行列に分割されており、基本行列とシフトベクトルとにより、jが0、1、2、3、4、5、6および7のうちの1つであるシフトサイズZ = 3×2^jを使用して記述されており、
前記基本行列は、各ZxZの部分行列について一つの成分を有しており、当該成分のうち、ゼロ行列である前記部分行列に対応するものは0であり、当該成分のうち、k個の成分だけ右に列を巡回的にシフトすることによりZxZの単位行列から得られる巡回置換行列である前記部分行列に対応するものは1であり、
前記基本行列は46x68のサイズを有し、当該基本行列においてゼロでない成分はトリプルズ(e, r, c)によって記述され、当該トリプルズ(e, r, c)は、eと番号付けされたゼロでない成分が前記基本行列における行r、列cに存在することを示すものであり、当該トリプルズは、
(1, 1, 1) (2, 1, 2) (3, 1, 3) (4, 1, 4) (5, 1, 6) (6, 1, 7) (7, 1, 10) (8, 1, 11) (9, 1, 12) (10, 1, 13) (11, 1, 14) (12, 1, 16) (13, 1, 17) (14, 1, 19) (15, 1, 20) (16, 1, 21) (17, 1, 22) (18, 1, 23) (19, 1, 24) (20, 2, 1) (21, 2, 3) (22, 2, 4) (23, 2, 5) (24, 2, 6) (25, 2, 8) (26, 2, 9) (27, 2, 10) (28, 2, 12) (29, 2, 13) (30, 2, 15) (31, 2, 16) (32, 2, 17) (33, 2, 18) (34, 2, 20) (35, 2, 22) (36, 2, 23) (37, 2, 24) (38, 2, 25) (39, 3, 1) (40, 3, 2) (41, 3, 3) (42, 3, 5) (43, 3, 6) (44, 3, 7) (45, 3, 8) (46, 3, 9) (47, 3, 10) (48, 3, 11) (49, 3, 14) (50, 3, 15) (51, 3, 16) (52, 3, 18) (53, 3, 19) (54, 3, 20) (55, 3, 21) (56, 3, 25) (57, 3, 26) (58, 4, 1) (59, 4, 2) (60, 4, 4) (61, 4, 5) (62, 4, 7) (63, 4, 8) (64, 4, 9) (65, 4, 11) (66, 4, 12) (67, 4, 13) (68, 4, 14) (69, 4, 15) (70, 4, 17) (71, 4, 18) (72, 4, 19) (73, 4, 21) (74, 4, 22) (75, 4, 23) (76, 4, 26) (77, 5, 1) (78, 5, 2) (79, 5, 27) (80, 6, 1) (81, 6, 2) (82, 6, 4) (83, 6, 13) (84, 6, 17) (85, 6, 22) (86, 6, 23) (87, 6, 28) (88, 7, 1) (89, 7, 7) (90, 7, 11) (91, 7, 12) (92, 7, 14) (93, 7, 18) (94, 7, 19) (95, 7, 21) (96, 7, 29) (97, 8, 1) (98, 8, 2) (99, 8, 5) (100, 8, 8) (101, 8, 9) (102, 8, 15) (103, 8, 30) (104, 9, 1) (105, 9, 2) (106, 9, 4) (107, 9, 13) (108, 9, 17) (109, 9, 20) (110, 9, 22) (111, 9, 23) (112, 9, 25) (113, 9, 31) (114, 10, 1) (115, 10, 2) (116, 10, 11) (117, 10, 12) (118, 10, 14) (119, 10, 18) (120, 10, 19) (121, 10, 21) (122, 10, 32) (123, 11, 2) (124, 11, 3) (125, 11, 5) (126, 11, 8) (127, 11, 9) (128, 11, 15) (129, 11, 33) (130, 12, 1) (131, 12, 2) (132, 12, 13) (133, 12, 17) (134, 12, 22) (135, 12, 23) (136, 12, 24) (137, 12, 34) (138, 13, 1) (139, 13, 2) (140, 13, 11) (141, 13, 12) (142, 13, 14) (143, 13, 19) (144, 13, 35) (145, 14, 1) (146, 14, 4) (147, 14, 8) (148, 14, 21) (149, 14, 24) (150, 14, 36) (151, 15, 1) (152, 15, 13) (153, 15, 16) (154, 15, 17) (155, 15, 18) (156, 15, 22) (157, 15, 37) (158, 16, 1) (159, 16, 2) (160, 16, 11) (161, 16, 14) (162, 16, 19) (163, 16, 26) (164, 16, 38) (165, 17, 2) (166, 17, 4) (167, 17, 12) (168, 17, 21) (169, 17, 23) (170, 17, 39) (171, 18, 1) (172, 18, 15) (173, 18, 17) (174, 18, 18) (175, 18, 22) (176, 18, 40) (177, 19, 2) (178, 19, 13) (179, 19, 14) (180, 19, 19) (181, 19, 20) (182, 19, 41) (183, 20, 1) (184, 20, 2) (185, 20, 8) (186, 20, 9) (187, 20, 11) (188, 20, 42) (189, 21, 1) (190, 21, 4) (191, 21, 10) (192, 21, 12) (193, 21, 23) (194, 21, 43) (195, 22, 2) (196, 22, 6) (197, 22, 17) (198, 22, 21) (199, 22, 22) (200, 22, 44) (201, 23, 1) (202, 23, 13) (203, 23, 14) (204, 23, 18) (205, 23, 45) (206, 24, 2) (207, 24, 3) (208, 24, 11) (209, 24, 19) (210, 24, 46) (211, 25, 1) (212, 25, 4) (213, 25, 5) (214, 25, 12) (215, 25, 23) (216, 25, 47) (217, 26, 2) (218, 26, 7) (219, 26, 8) (220, 26, 15) (221, 26, 48) (222, 27, 1) (223, 27, 3) (224, 27, 5) (225, 27, 16) (226, 27, 49) (227, 28, 2) (228, 28, 7) (229, 28, 9) (230, 28, 50) (231, 29, 1) (232, 29, 5) (233, 29, 20) (234, 29, 22) (235, 29, 51) (236, 30, 2) (237, 30, 15) (238, 30, 19) (239, 30, 26) (240, 30, 52) (241, 31, 1) (242, 31, 11) (243, 31, 14) (244, 31, 25) (245, 31, 53) (246, 32, 2) (247, 32, 8) (248, 32, 23) (249, 32, 26) (250, 32, 54) (251, 33, 1) (252, 33, 13) (253, 33, 15) (254, 33, 25) (255, 33, 55) (256, 34, 2) (257, 34, 3) (258, 34, 12) (259, 34, 22) (260, 34, 56) (261, 35, 1) (262, 35, 8) (263, 35, 16) (264, 35, 18) (265, 35, 57) (266, 36, 2) (267, 36, 7) (268, 36, 13) (269, 36, 23) (270, 36, 58) (271, 37, 1) (272, 37, 15) (273, 37, 16) (274, 37, 19) (275, 37, 59) (276, 38, 2) (277, 38, 14) (278, 38, 24) (279, 38, 60) (280, 39, 1) (281, 39, 10) (282, 39, 11) (283, 39, 13) (284, 39, 61) (285, 40, 2) (286, 40, 4) (287, 40, 8) (288, 40, 20) (289, 40, 62) (290, 41, 1) (291, 41, 9) (292, 41, 18) (293, 41, 63) (294, 42, 2) (295, 42, 4) (296, 42, 10) (297, 42, 19) (298, 42, 64) (299, 43, 1) (300, 43, 5) (301, 43, 25) (302, 43, 65) (303, 44, 2) (304, 44, 17) (305, 44, 19) (306, 44, 26) (307, 44, 66) (308, 45, 1) (309, 45, 8) (310, 45, 10) (311, 45, 23) (312, 45, 67) (313, 46, 2) (314, 46, 7) (315, 46, 11) (316, 46, 68)によって与えられ、
eと番号付けされた前記ゼロでない成分について、前記kはmod(Ve, Z)によって与えられるシフト係数によって定義され、Veは前記シフトベクトルにおけるe番目の成分を指しており、当該シフトベクトルは、
[307, 19, 50, 369, 181, 216, 317, 288, 109, 17, 357, 215, 106, 242, 180, 330, 346, 1, 0, 76, 76, 73, 288, 144, 331, 331, 178, 295, 342, 217, 99, 354, 114, 331, 112, 0, 0, 0, 205, 250, 328, 332, 256, 161, 267, 160, 63, 129, 200, 88, 53, 131, 240, 205, 13, 0, 0, 276, 87, 0, 275, 199, 153, 56, 132, 305, 231, 341, 212, 304, 300, 271, 39, 357, 1, 0, 332, 181, 0, 195, 14, 115, 166, 241, 51, 157, 0, 278, 257, 1, 351, 92, 253, 18, 225, 0, 9, 62, 316, 333, 290, 114, 0, 307, 179, 165, 18, 39, 224, 368, 67, 170, 0, 366, 232, 321, 133, 57, 303, 63, 82, 0, 101, 339, 274, 111, 383, 354, 0, 48, 102, 8, 47, 188, 334, 115, 0, 77, 186, 174, 232, 50, 74, 0, 313, 177, 266, 115, 370, 0, 142, 248, 137, 89, 347, 12, 0, 241, 2, 210, 318, 55, 269, 0, 13, 338, 57, 289, 57, 0, 260, 303, 81, 358, 375, 0, 130, 163, 280, 132, 4, 0, 145, 213, 344, 242, 197, 0, 187, 206, 264, 341, 59, 0, 205, 102, 328, 213, 97, 0, 30, 11, 233, 22, 0, 24, 89, 61, 27, 0, 298, 158, 235, 339, 234, 0, 72, 17, 383, 312, 0, 71, 81, 76, 136, 0, 194, 194, 101, 0, 222, 19, 244, 274, 0, 252, 5, 147, 78, 0, 159, 229, 260, 90, 0, 100, 215, 258, 256, 0, 102, 201, 175, 287, 0, 323, 8, 361, 105, 0, 230, 148, 202, 312, 0, 320, 335, 2, 266, 0, 210, 313, 297, 21, 0, 269, 82, 115, 0, 185, 177, 289, 214, 0, 258, 93, 346, 297, 0, 175, 37, 312, 0, 52, 314, 139, 288, 0, 113, 14, 218, 0, 113, 132, 114, 168, 0, 80, 78, 163, 274, 0, 135, 149, 15, 0]である、
方法。 - 無線通信ネットワークの無線受信機において使用するための方法であって、前記方法は、
無線送信機から符号化された情報ビットを受信すること(312)と、
低密度パリティ検査、LDPC、符号のパリティ検査行列、PCM、を使用して前記情報ビットを復号すること(314)と、を有し、ここで、前記PCMは、サイズがZxZである正方部分行列に分割されており、基本行列とシフトベクトルとにより、jが0、1、2、3、4、および5のうちの1つであるシフトサイズZ = 7×2^jを使用して記述されており、
前記基本行列は、各ZxZの部分行列について一つの成分を有しており、当該成分のうち、ゼロ行列である前記部分行列に対応するものは0であり、当該成分のうち、k個の成分だけ右に列を巡回的にシフトすることによりZxZの単位行列から得られる巡回置換行列である前記部分行列に対応するものは1であり、
前記基本行列は42x52のサイズを有し、当該基本行列においてゼロでない成分はトリプルズ(e, r, c)によって記述され、当該トリプルズ(e, r, c)は、eと番号付けされたゼロでない成分が前記基本行列における行r、列cに存在することを示すものであり、当該トリプルズは、
(1, 1, 1) (2, 1, 2) (3, 1, 3) (4, 1, 4) (5, 1, 7) (6, 1, 10) (7, 1, 11) (8, 1, 12) (9, 2, 1) (10, 2, 4) (11, 2, 5) (12, 2, 6) (13, 2, 7) (14, 2, 8) (15, 2, 9) (16, 2, 10) (17, 2, 12) (18, 2, 13) (19, 3, 1) (20, 3, 2) (21, 3, 4) (22, 3, 5) (23, 3, 9) (24, 3, 11) (25, 3, 13) (26, 3, 14) (27, 4, 2) (28, 4, 3) (29, 4, 5) (30, 4, 6) (31, 4, 7) (32, 4, 8) (33, 4, 9) (34, 4, 10) (35, 4, 11) (36, 4, 14) (37, 5, 1) (38, 5, 2) (39, 5, 12) (40, 5, 15) (41, 6, 1) (42, 6, 2) (43, 6, 6) (44, 6, 8) (45, 6, 12) (46, 6, 16) (47, 7, 1) (48, 7, 6) (49, 7, 8) (50, 7, 10) (51, 7, 12) (52, 7, 17) (53, 8, 2) (54, 8, 6) (55, 8, 8) (56, 8, 12) (57, 8, 14) (58, 8, 18) (59, 9, 1) (60, 9, 2) (61, 9, 13) (62, 9, 19) (63, 10, 2) (64, 10, 9) (65, 10, 11) (66, 10, 12) (67, 10, 20) (68, 11, 1) (69, 11, 2) (70, 11, 7) (71, 11, 8) (72, 11, 21) (73, 12, 1) (74, 12, 8) (75, 12, 10) (76, 12, 14) (77, 12, 22) (78, 13, 2) (79, 13, 4) (80, 13, 12) (81, 13, 23) (82, 14, 1) (83, 14, 2) (84, 14, 9) (85, 14, 14) (86, 14, 24) (87, 15, 2) (88, 15, 7) (89, 15, 12) (90, 15, 14) (91, 15, 25) (92, 16, 1) (93, 16, 11) (94, 16, 12) (95, 16, 26) (96, 17, 2) (97, 17, 10) (98, 17, 12) (99, 17, 13) (100, 17, 27) (101, 18, 2) (102, 18, 6) (103, 18, 12) (104, 18, 13) (105, 18, 28) (106, 19, 1) (107, 19, 7) (108, 19, 8) (109, 19, 29) (110, 20, 1) (111, 20, 2) (112, 20, 11) (113, 20, 30) (114, 21, 2) (115, 21, 5) (116, 21, 12) (117, 21, 31) (118, 22, 1) (119, 22, 9) (120, 22, 14) (121, 22, 32) (122, 23, 2) (123, 23, 3) (124, 23, 33) (125, 24, 1) (126, 24, 4) (127, 24, 6) (128, 24, 34) (129, 25, 2) (130, 25, 3) (131, 25, 10) (132, 25, 35) (133, 26, 1) (134, 26, 6) (135, 26, 36) (136, 27, 3) (137, 27, 8) (138, 27, 13) (139, 27, 14) (140, 27, 37) (141, 28, 1) (142, 28, 7) (143, 28, 38) (144, 29, 2) (145, 29, 3) (146, 29, 6) (147, 29, 39) (148, 30, 1) (149, 30, 5) (150, 30, 40) (151, 31, 3) (152, 31, 6) (153, 31, 8) (154, 31, 10) (155, 31, 41) (156, 32, 2) (157, 32, 14) (158, 32, 42) (159, 33, 1) (160, 33, 6) (161, 33, 13) (162, 33, 43) (163, 34, 3) (164, 34, 8) (165, 34, 11) (166, 34, 44) (167, 35, 1) (168, 35, 13) (169, 35, 14) (170, 35, 45) (171, 36, 2) (172, 36, 6) (173, 36, 12) (174, 36, 46) (175, 37, 1) (176, 37, 3) (177, 37, 8) (178, 37, 47) (179, 38, 11) (180, 38, 14) (181, 38, 48) (182, 39, 2) (183, 39, 6) (184, 39, 12) (185, 39, 49) (186, 40, 1) (187, 40, 8) (188, 40, 13) (189, 40, 50) (190, 41, 3) (191, 41, 11) (192, 41, 14) (193, 41, 51) (194, 42, 2) (195, 42, 6) (196, 42, 12) (197, 42, 52)によって与えられ、
eと番号付けされた前記ゼロでない成分について、前記kはmod(Ve, Z)によって与えられるシフト係数によって定義され、Veは前記シフトベクトルにおけるe番目の成分を指しており、当該シフトベクトルは、
[72, 110, 23, 181, 95, 8, 1, 0, 53, 156, 115, 156, 115, 200, 29, 31, 0, 0, 152, 131, 46, 191, 91, 0, 0, 0, 185, 6, 36, 124, 124, 110, 156, 133, 1, 0, 200, 16, 101, 0, 185, 138, 170, 219, 193, 0, 123, 55, 31, 222, 209, 0, 103, 13, 105, 150, 181, 0, 147, 43, 152, 0, 2, 30, 184, 83, 0, 174, 150, 8, 56, 0, 99, 138, 110, 99, 0, 46, 217, 109, 0, 37, 113, 143, 140, 0, 36, 95, 40, 116, 0, 116, 200, 110, 0, 75, 158, 134, 97, 0, 48, 132, 206, 2, 0, 68, 16, 156, 0, 35, 138, 86, 0, 6, 20, 141, 0, 80, 43, 81, 0, 49, 1, 0, 156, 54, 134, 0, 153, 88, 63, 0, 211, 94, 0, 90, 6, 221, 6, 0, 27, 118, 0, 216, 212, 193, 0, 108, 61, 0, 106, 44, 185, 176, 0, 147, 182, 0, 108, 21, 110, 0, 71, 12, 109, 0, 29, 201, 69, 0, 91, 165, 55, 0, 1, 175, 83, 0, 40, 12, 0, 37, 97, 46, 0, 106, 181, 154, 0, 98, 35, 36, 0, 120, 101, 81, 0]である、
方法。 - 請求項13または14に記載の方法であって、
前記無線受信機(110,120)は、ネットワークノードである、方法。 - 請求項13または14に記載の方法であって、
前記無線受信機(110,120)は、無線デバイスである、方法。
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BR112019027009A2 (pt) | 2020-06-30 |
EP3672085A1 (en) | 2020-06-24 |
AU2018293680B2 (en) | 2021-07-29 |
MX2019015458A (es) | 2020-02-12 |
AU2018293680A1 (en) | 2020-01-02 |
DK3491741T3 (da) | 2020-03-02 |
CN110832782A (zh) | 2020-02-21 |
WO2019002284A1 (en) | 2019-01-03 |
US11515893B2 (en) | 2022-11-29 |
US20240146331A1 (en) | 2024-05-02 |
CA3067701A1 (en) | 2019-01-03 |
KR102181784B1 (ko) | 2020-11-24 |
PH12019502740A1 (en) | 2020-07-13 |
US20230087194A1 (en) | 2023-03-23 |
US20200228142A1 (en) | 2020-07-16 |
CN110832782B (zh) | 2024-04-02 |
JP2020535670A (ja) | 2020-12-03 |
RU2731883C1 (ru) | 2020-09-08 |
EP3491741A1 (en) | 2019-06-05 |
PT3491741T (pt) | 2020-01-16 |
US20190296767A1 (en) | 2019-09-26 |
PL3491741T3 (pl) | 2020-05-18 |
MA47656B1 (fr) | 2021-02-26 |
KR20200004404A (ko) | 2020-01-13 |
US10644724B2 (en) | 2020-05-05 |
CA3067701C (en) | 2022-08-16 |
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