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H A Dgps12.g2 [[1, Factorial(1101)/2,1,"2",[[1100,1]],1099, "Alt(1101)", ["A",1101, 1], "Alt"],
3 [2, Factorial(1101),0,"2",[[1100, 1]],1101, "Sym(1101)", ["A",1101, 1], "Sym"]];
5 [[1, Factorial(1102)/2,1,"2",[[1101,1]],1100, "Alt(1102)", ["A",1102, 1], "Alt"],
6 [2, Factorial(1102),0,"2",[[1101, 1]],1102, "Sym(1102)", ["A",1102, 1], "Sym"]];
16 [9, Factorial(1103)/2,1,"2",[[1102,1]],1101, "Alt(1103)", ["A",1103, 1], "Alt"],
17 [10, Factorial(1103),0,"2",[[1102, 1]],1103, "Sym(1103)", ["A",1103, 1], "Sym"]];
21 [3, Factorial(1104)/2,1,"2",[[1103,1]],1102, "Alt(1104)", ["A",1104, 1], "Alt"],
22 [4, Factorial(1104),0,"2",[[1103, 1]],1104, "Sym(1104)", ["A",1104, 1], "Sym"]];
29 [6, Factorial(1105)/2,1,"2",[[1104,1]],1103, "Alt(1105)", ["A",1105, 1], "Alt"],
30 [7, Factorial(1105),0,"2",[[1104, 1]],1105, "Sym(1105)", ["A",1105, 1], "Sym"]];
[all …]
H A Dgps24.g2 [[1, Factorial(2403)/2,1,"2",[[2402,1]],2401, "Alt(2403)", ["A",2403, 1], "Alt"],
3 [2, Factorial(2403),0,"2",[[2402, 1]],2403, "Sym(2403)", ["A",2403, 1], "Sym"]];
5 [[1, Factorial(2404)/2,1,"2",[[2403,1]],2402, "Alt(2404)", ["A",2404, 1], "Alt"],
6 [2, Factorial(2404),0,"2",[[2403, 1]],2404, "Sym(2404)", ["A",2404, 1], "Sym"]];
8 [[1, Factorial(2405)/2,1,"2",[[2404,1]],2403, "Alt(2405)", ["A",2405, 1], "Alt"],
9 [2, Factorial(2405),0,"2",[[2404, 1]],2405, "Sym(2405)", ["A",2405, 1], "Sym"]];
11 [[1, Factorial(2406)/2,1,"2",[[2405,1]],2404, "Alt(2406)", ["A",2406, 1], "Alt"],
12 [2, Factorial(2406),0,"2",[[2405, 1]],2406, "Sym(2406)", ["A",2406, 1], "Sym"]];
14 [[1, Factorial(2407)/2,1,"2",[[2406,1]],2405, "Alt(2407)", ["A",2407, 1], "Alt"],
15 [2, Factorial(2407),0,"2",[[2406, 1]],2407, "Sym(2407)", ["A",2407, 1], "Sym"]];
[all …]
H A Dgps29.g2 [[1,Factorial(2929)/2,1,"2",[ [ 2928, 1 ] ],2927,"Alt(2929)",["A",1,1],"Alt"],
3 [2,Factorial(2929),0,"2",[ [ 2928, 1 ] ],2929,"Sym(2929)",["A",2,1],"Sym"]];
5 [[1,Factorial(2930)/2,1,"2",[ [ 2929, 1 ] ],2928,"Alt(2930)",["A",1,1],"Alt"],
6 [2,Factorial(2930),0,"2",[ [ 2929, 1 ] ],2930,"Sym(2930)",["A",2,1],"Sym"]];
8 [[1,Factorial(2931)/2,1,"2",[ [ 2930, 1 ] ],2929,"Alt(2931)",["A",1,1],"Alt"],
9 [2,Factorial(2931),0,"2",[ [ 2930, 1 ] ],2931,"Sym(2931)",["A",2,1],"Sym"]];
11 [[1,Factorial(2932)/2,1,"2",[ [ 2931, 1 ] ],2930,"Alt(2932)",["A",1,1],"Alt"],
12 [2,Factorial(2932),0,"2",[ [ 2931, 1 ] ],2932,"Sym(2932)",["A",2,1],"Sym"]];
15 [2,Factorial(2933),0,"2",[ [ 2932, 1 ] ],2933,"Sym(2933)",["A",2,1],"Sym"]];
18 [2,Factorial(2934),0,"2",[ [ 2933, 1 ] ],2934,"Sym(2934)",["A",2,1],"Sym"]];
[all …]
H A Dgps37.g2 [[1,Factorial(3723)/2,1,"2",[ [ 3722, 1 ] ],3721,"Alt(3723)",["A",1,1],"Alt"],
3 [2,Factorial(3723),0,"2",[ [ 3722, 1 ] ],3723,"Sym(3723)",["A",2,1],"Sym"]];
5 [[1,Factorial(3724)/2,1,"2",[ [ 3723, 1 ] ],3722,"Alt(3724)",["A",1,1],"Alt"],
6 [2,Factorial(3724),0,"2",[ [ 3723, 1 ] ],3724,"Sym(3724)",["A",2,1],"Sym"]];
8 [[1,Factorial(3725)/2,1,"2",[ [ 3724, 1 ] ],3723,"Alt(3725)",["A",1,1],"Alt"],
9 [2,Factorial(3725),0,"2",[ [ 3724, 1 ] ],3725,"Sym(3725)",["A",2,1],"Sym"]];
11 [[1,Factorial(3726)/2,1,"2",[ [ 3725, 1 ] ],3724,"Alt(3726)",["A",1,1],"Alt"],
12 [2,Factorial(3726),0,"2",[ [ 3725, 1 ] ],3726,"Sym(3726)",["A",2,1],"Sym"]];
40 [4,Factorial(3728),0,"2",[ [ 3727, 1 ] ],3728,"Sym(3728)",["A",4,1],"Sym"]];
43 [2,Factorial(3729),0,"2",[ [ 3728, 1 ] ],3729,"Sym(3729)",["A",2,1],"Sym"]];
[all …]
H A Dgps28.g2002 [7,Factorial(2810),0,"2",[ [ 2809, 1 ] ],2810,"Sym(2810)",["A",7,1],"Sym"]];
2005 [2,Factorial(2811),0,"2",[ [ 2810, 1 ] ],2811,"Sym(2811)",["A",2,1],"Sym"]];
2008 [2,Factorial(2812),0,"2",[ [ 2811, 1 ] ],2812,"Sym(2812)",["A",2,1],"Sym"]];
2011 [2,Factorial(2813),0,"2",[ [ 2812, 1 ] ],2813,"Sym(2813)",["A",2,1],"Sym"]];
2014 [2,Factorial(2814),0,"2",[ [ 2813, 1 ] ],2814,"Sym(2814)",["A",2,1],"Sym"]];
2017 [2,Factorial(2815),0,"2",[ [ 2814, 1 ] ],2815,"Sym(2815)",["A",2,1],"Sym"]];
2020 [2,Factorial(2816),0,"2",[ [ 2815, 1 ] ],2816,"Sym(2816)",["A",2,1],"Sym"]];
2023 [2,Factorial(2817),0,"2",[ [ 2816, 1 ] ],2817,"Sym(2817)",["A",2,1],"Sym"]];
2026 [2,Factorial(2818),0,"2",[ [ 2817, 1 ] ],2818,"Sym(2818)",["A",2,1],"Sym"]];
2033 [6,Factorial(2819),0,"2",[ [ 2818, 1 ] ],2819,"Sym(2819)",["A",6,1],"Sym"]];
[all …]
H A Dgps38.g4 [3,Factorial(3852)/2,1,"2",[ [ 3851, 1 ] ],3850,"Alt(3852)",["A",3,1],"Alt"],
5 [4,Factorial(3852),0,"2",[ [ 3851, 1 ] ],3852,"Sym(3852)",["A",4,1],"Sym"]];
30 [3,Factorial(3854)/2,1,"2",[ [ 3853, 1 ] ],3852,"Alt(3854)",["A",3,1],"Alt"],
31 [4,Factorial(3854),0,"2",[ [ 3853, 1 ] ],3854,"Sym(3854)",["A",4,1],"Sym"]];
34 [2,Factorial(3855),0,"2",[ [ 3854, 1 ] ],3855,"Sym(3855)",["A",2,1],"Sym"]];
37 [2,Factorial(3856),0,"2",[ [ 3855, 1 ] ],3856,"Sym(3856)",["A",2,1],"Sym"]];
40 [2,Factorial(3857),0,"2",[ [ 3856, 1 ] ],3857,"Sym(3857)",["A",2,1],"Sym"]];
43 [2,Factorial(3858),0,"2",[ [ 3857, 1 ] ],3858,"Sym(3858)",["A",2,1],"Sym"]];
46 [2,Factorial(3859),0,"2",[ [ 3858, 1 ] ],3859,"Sym(3859)",["A",2,1],"Sym"]];
49 [2,Factorial(3860),0,"2",[ [ 3859, 1 ] ],3860,"Sym(3860)",["A",2,1],"Sym"]];
[all …]
H A Dgps39.g2 [[1,Factorial(3970)/2,1,"2",[ [ 3969, 1 ] ],3968,"Alt(3970)",["A",1,1],"Alt"],
3 [2,Factorial(3970),0,"2",[ [ 3969, 1 ] ],3970,"Sym(3970)",["A",2,1],"Sym"]];
5 [[1,Factorial(3971)/2,1,"2",[ [ 3970, 1 ] ],3969,"Alt(3971)",["A",1,1],"Alt"],
6 [2,Factorial(3971),0,"2",[ [ 3970, 1 ] ],3971,"Sym(3971)",["A",2,1],"Sym"]];
8 [[1,Factorial(3972)/2,1,"2",[ [ 3971, 1 ] ],3970,"Alt(3972)",["A",1,1],"Alt"],
9 [2,Factorial(3972),0,"2",[ [ 3971, 1 ] ],3972,"Sym(3972)",["A",2,1],"Sym"]];
11 [[1,Factorial(3973)/2,1,"2",[ [ 3972, 1 ] ],3971,"Alt(3973)",["A",1,1],"Alt"],
12 [2,Factorial(3973),0,"2",[ [ 3972, 1 ] ],3973,"Sym(3973)",["A",2,1],"Sym"]];
15 [2,Factorial(3974),0,"2",[ [ 3973, 1 ] ],3974,"Sym(3974)",["A",2,1],"Sym"]];
18 [2,Factorial(3975),0,"2",[ [ 3974, 1 ] ],3975,"Sym(3975)",["A",2,1],"Sym"]];
[all …]
H A Dgps15.g2 [[1, Factorial(1401)/2,1,"2",[[1400,1]],1399, "Alt(1401)", ["A",1401, 1], "Alt"],
3 [2, Factorial(1401),0,"2",[[1400, 1]],1401, "Sym(1401)", ["A",1401, 1], "Sym"]];
5 [[1, Factorial(1402)/2,1,"2",[[1401,1]],1400, "Alt(1402)", ["A",1402, 1], "Alt"],
6 [2, Factorial(1402),0,"2",[[1401, 1]],1402, "Sym(1402)", ["A",1402, 1], "Sym"]];
8 [[1, Factorial(1403)/2,1,"2",[[1402,1]],1401, "Alt(1403)", ["A",1403, 1], "Alt"],
9 [2, Factorial(1403),0,"2",[[1402, 1]],1403, "Sym(1403)", ["A",1403, 1], "Sym"]];
11 [[1, Factorial(1404)/2,1,"2",[[1403,1]],1402, "Alt(1404)", ["A",1404, 1], "Alt"],
12 [2, Factorial(1404),0,"2",[[1403, 1]],1404, "Sym(1404)", ["A",1404, 1], "Sym"]];
14 [[1, Factorial(1405)/2,1,"2",[[1404,1]],1403, "Alt(1405)", ["A",1405, 1], "Alt"],
15 [2, Factorial(1405),0,"2",[[1404, 1]],1405, "Sym(1405)", ["A",1405, 1], "Sym"]];
[all …]
H A Dgps31.g24 [23,Factorial(3137),0,"2",[ [ 3136, 1 ] ],3137,"Sym(3137)",["A",23,1],"Sym"]];
28 [3,Factorial(3138)/2,1,"2",[ [ 3137, 1 ] ],3136,"Alt(3138)",["A",3,1],"Alt"],
29 [4,Factorial(3138),0,"2",[ [ 3137, 1 ] ],3138,"Sym(3138)",["A",4,1],"Sym"]];
32 [2,Factorial(3139),0,"2",[ [ 3138, 1 ] ],3139,"Sym(3139)",["A",2,1],"Sym"]];
35 [2,Factorial(3140),0,"2",[ [ 3139, 1 ] ],3140,"Sym(3140)",["A",2,1],"Sym"]];
38 [2,Factorial(3141),0,"2",[ [ 3140, 1 ] ],3141,"Sym(3141)",["A",2,1],"Sym"]];
41 [2,Factorial(3142),0,"2",[ [ 3141, 1 ] ],3142,"Sym(3142)",["A",2,1],"Sym"]];
44 [2,Factorial(3143),0,"2",[ [ 3142, 1 ] ],3143,"Sym(3143)",["A",2,1],"Sym"]];
47 [2,Factorial(3144),0,"2",[ [ 3143, 1 ] ],3144,"Sym(3144)",["A",2,1],"Sym"]];
50 [2,Factorial(3145),0,"2",[ [ 3144, 1 ] ],3145,"Sym(3145)",["A",2,1],"Sym"]];
[all …]
H A Dgps35.g4 [3,Factorial(3558)/2,1,"2",[ [ 3557, 1 ] ],3556,"Alt(3558)",["A",3,1],"Alt"],
5 [4,Factorial(3558),0,"2",[ [ 3557, 1 ] ],3558,"Sym(3558)",["A",4,1],"Sym"]];
15 [9,Factorial(3559)/2,1,"2",[ [ 3558, 1 ] ],3557,"Alt(3559)",["A",9,1],"Alt"],
16 [10,Factorial(3559),0,"2",[ [ 3558, 1 ] ],3559,"Sym(3559)",["A",10,1],"Sym"]];
20 [3,Factorial(3560)/2,1,"2",[ [ 3559, 1 ] ],3558,"Alt(3560)",["A",3,1],"Alt"],
21 [4,Factorial(3560),0,"2",[ [ 3559, 1 ] ],3560,"Sym(3560)",["A",4,1],"Sym"]];
24 [2,Factorial(3561),0,"2",[ [ 3560, 1 ] ],3561,"Sym(3561)",["A",2,1],"Sym"]];
27 [2,Factorial(3562),0,"2",[ [ 3561, 1 ] ],3562,"Sym(3562)",["A",2,1],"Sym"]];
30 [2,Factorial(3563),0,"2",[ [ 3562, 1 ] ],3563,"Sym(3563)",["A",2,1],"Sym"]];
33 [2,Factorial(3564),0,"2",[ [ 3563, 1 ] ],3564,"Sym(3564)",["A",2,1],"Sym"]];
[all …]
H A Dgps18.g20 [19, Factorial(1901)/2,1,"2",[[1900,1]],1899, "Alt(1901)", ["A",1901, 1], "Alt"],
21 [20, Factorial(1901),0,"2",[[1900, 1]],1901, "Sym(1901)", ["A",1901, 1], "Sym"]];
25 [3, Factorial(1902)/2,1,"2",[[1901,1]],1900, "Alt(1902)", ["A",1902, 1], "Alt"],
26 [4, Factorial(1902),0,"2",[[1901, 1]],1902, "Sym(1902)", ["A",1902, 1], "Sym"]];
28 [[1, Factorial(1903)/2,1,"2",[[1902,1]],1901, "Alt(1903)", ["A",1903, 1], "Alt"],
29 [2, Factorial(1903),0,"2",[[1902, 1]],1903, "Sym(1903)", ["A",1903, 1], "Sym"]];
32 [2, Factorial(1904),0,"2",[[1903, 1]],1904, "Sym(1904)", ["A",1904, 1], "Sym"]];
35 [2, Factorial(1905),0,"2",[[1904, 1]],1905, "Sym(1905)", ["A",1905, 1], "Sym"]];
38 [2, Factorial(1906),0,"2",[[1905, 1]],1906, "Sym(1906)", ["A",1906, 1], "Sym"]];
44 [5, Factorial(1907)/2,1,"2",[[1906,1]],1905, "Alt(1907)", ["A",1907, 1], "Alt"],
[all …]
H A Dgps32.g4 [3,Factorial(3252)/2,1,"2",[ [ 3251, 1 ] ],3250,"Alt(3252)",["A",3,1],"Alt"],
5 [4,Factorial(3252),0,"2",[ [ 3251, 1 ] ],3252,"Sym(3252)",["A",4,1],"Sym"]];
19 [13,Factorial(3253)/2,1,"2",[ [ 3252, 1 ] ],3251,"Alt(3253)",["A",13,1],"Alt"],
20 [14,Factorial(3253),0,"2",[ [ 3252, 1 ] ],3253,"Sym(3253)",["A",14,1],"Sym"]];
24 [3,Factorial(3254)/2,1,"2",[ [ 3253, 1 ] ],3252,"Alt(3254)",["A",3,1],"Alt"],
25 [4,Factorial(3254),0,"2",[ [ 3253, 1 ] ],3254,"Sym(3254)",["A",4,1],"Sym"]];
27 [[1,Factorial(3255)/2,1,"2",[ [ 3254, 1 ] ],3253,"Alt(3255)",["A",1,1],"Alt"],
28 [2,Factorial(3255),0,"2",[ [ 3254, 1 ] ],3255,"Sym(3255)",["A",2,1],"Sym"]];
30 [[1,Factorial(3256)/2,1,"2",[ [ 3255, 1 ] ],3254,"Alt(3256)",["A",1,1],"Alt"],
31 [2,Factorial(3256),0,"2",[ [ 3255, 1 ] ],3256,"Sym(3256)",["A",2,1],"Sym"]];
[all …]
H A Dgps22.g2 [[1, Factorial(2226)/2,1,"2",[[2225,1]],2224, "Alt(2226)", ["A",2226, 1], "Alt"],
3 [2, Factorial(2226),0,"2",[[2225, 1]],2226, "Sym(2226)", ["A",2226, 1], "Sym"]];
5 [[1, Factorial(2227)/2,1,"2",[[2226,1]],2225, "Alt(2227)", ["A",2227, 1], "Alt"],
6 [2, Factorial(2227),0,"2",[[2226, 1]],2227, "Sym(2227)", ["A",2227, 1], "Sym"]];
8 [[1, Factorial(2228)/2,1,"2",[[2227,1]],2226, "Alt(2228)", ["A",2228, 1], "Alt"],
9 [2, Factorial(2228),0,"2",[[2227, 1]],2228, "Sym(2228)", ["A",2228, 1], "Sym"]];
11 [[1, Factorial(2229)/2,1,"2",[[2228,1]],2227, "Alt(2229)", ["A",2229, 1], "Alt"],
12 [2, Factorial(2229),0,"2",[[2228, 1]],2229, "Sym(2229)", ["A",2229, 1], "Sym"]];
14 [[1, Factorial(2230)/2,1,"2",[[2229,1]],2228, "Alt(2230)", ["A",2230, 1], "Alt"],
15 [2, Factorial(2230),0,"2",[[2229, 1]],2230, "Sym(2230)", ["A",2230, 1], "Sym"]];
[all …]
H A Dgps33.g2 [[1,Factorial(3356)/2,1,"2",[ [ 3355, 1 ] ],3354,"Alt(3356)",["A",1,1],"Alt"],
3 [2,Factorial(3356),0,"2",[ [ 3355, 1 ] ],3356,"Sym(3356)",["A",2,1],"Sym"]];
5 [[1,Factorial(3357)/2,1,"2",[ [ 3356, 1 ] ],3355,"Alt(3357)",["A",1,1],"Alt"],
6 [2,Factorial(3357),0,"2",[ [ 3356, 1 ] ],3357,"Sym(3357)",["A",2,1],"Sym"]];
8 [[1,Factorial(3358)/2,1,"2",[ [ 3357, 1 ] ],3356,"Alt(3358)",["A",1,1],"Alt"],
9 [2,Factorial(3358),0,"2",[ [ 3357, 1 ] ],3358,"Sym(3358)",["A",2,1],"Sym"]];
19 [9,Factorial(3359)/2,1,"2",[ [ 3358, 1 ] ],3357,"Alt(3359)",["A",9,1],"Alt"],
20 [10,Factorial(3359),0,"2",[ [ 3358, 1 ] ],3359,"Sym(3359)",["A",10,1],"Sym"]];
24 [3,Factorial(3360)/2,1,"2",[ [ 3359, 1 ] ],3358,"Alt(3360)",["A",3,1],"Alt"],
25 [4,Factorial(3360),0,"2",[ [ 3359, 1 ] ],3360,"Sym(3360)",["A",4,1],"Sym"]];
[all …]
H A Dgps25.g12224 [2,Factorial(2501),0,"2",[ [ 2500, 1 ] ],2501,"Sym(2501)",["A",2,1],"Sym"]];
12227 [2,Factorial(2502),0,"2",[ [ 2501, 1 ] ],2502,"Sym(2502)",["A",2,1],"Sym"]];
12247 [4,Factorial(2504),0,"2",[ [ 2503, 1 ] ],2504,"Sym(2504)",["A",4,1],"Sym"]];
12250 [2,Factorial(2505),0,"2",[ [ 2504, 1 ] ],2505,"Sym(2505)",["A",2,1],"Sym"]];
12253 [2,Factorial(2506),0,"2",[ [ 2505, 1 ] ],2506,"Sym(2506)",["A",2,1],"Sym"]];
12256 [2,Factorial(2507),0,"2",[ [ 2506, 1 ] ],2507,"Sym(2507)",["A",2,1],"Sym"]];
12259 [2,Factorial(2508),0,"2",[ [ 2507, 1 ] ],2508,"Sym(2508)",["A",2,1],"Sym"]];
12262 [2,Factorial(2509),0,"2",[ [ 2508, 1 ] ],2509,"Sym(2509)",["A",2,1],"Sym"]];
12265 [2,Factorial(2510),0,"2",[ [ 2509, 1 ] ],2510,"Sym(2510)",["A",2,1],"Sym"]];
12268 [2,Factorial(2511),0,"2",[ [ 2510, 1 ] ],2511,"Sym(2511)",["A",2,1],"Sym"]];
[all …]
H A Dgps26.g2 [[1,Factorial(2608)/2,1,"2",[ [ 2607, 1 ] ],2606,"Alt(2608)",["A",1,1],"Alt"],
3 [2,Factorial(2608),0,"2",[ [ 2607, 1 ] ],2608,"Sym(2608)",["A",2,1],"Sym"]];
16 [12,Factorial(2609),0,"2",[ [ 2608, 1 ] ],2609,"Sym(2609)",["A",12,1],"Sym"]];
20 [3,Factorial(2610)/2,1,"2",[ [ 2609, 1 ] ],2608,"Alt(2610)",["A",3,1],"Alt"],
21 [4,Factorial(2610),0,"2",[ [ 2609, 1 ] ],2610,"Sym(2610)",["A",4,1],"Sym"]];
24 [2,Factorial(2611),0,"2",[ [ 2610, 1 ] ],2611,"Sym(2611)",["A",2,1],"Sym"]];
27 [2,Factorial(2612),0,"2",[ [ 2611, 1 ] ],2612,"Sym(2612)",["A",2,1],"Sym"]];
30 [2,Factorial(2613),0,"2",[ [ 2612, 1 ] ],2613,"Sym(2613)",["A",2,1],"Sym"]];
33 [2,Factorial(2614),0,"2",[ [ 2613, 1 ] ],2614,"Sym(2614)",["A",2,1],"Sym"]];
36 [2,Factorial(2615),0,"2",[ [ 2614, 1 ] ],2615,"Sym(2615)",["A",2,1],"Sym"]];
[all …]
H A Dgps20.g2 [[1, Factorial(2051)/2,1,"2",[[2050,1]],2049, "Alt(2051)", ["A",2051, 1], "Alt"],
3 [2, Factorial(2051),0,"2",[[2050, 1]],2051, "Sym(2051)", ["A",2051, 1], "Sym"]];
5 [[1, Factorial(2052)/2,1,"2",[[2051,1]],2050, "Alt(2052)", ["A",2052, 1], "Alt"],
6 [2, Factorial(2052),0,"2",[[2051, 1]],2052, "Sym(2052)", ["A",2052, 1], "Sym"]];
32 [25, Factorial(2053)/2,1,"2",[[2052,1]],2051, "Alt(2053)", ["A",2053, 1], "Alt"],
33 [26, Factorial(2053),0,"2",[[2052, 1]],2053, "Sym(2053)", ["A",2053, 1], "Sym"]];
37 [3, Factorial(2054)/2,1,"2",[[2053,1]],2052, "Alt(2054)", ["A",2054, 1], "Alt"],
38 [4, Factorial(2054),0,"2",[[2053, 1]],2054, "Sym(2054)", ["A",2054, 1], "Sym"]];
41 [2, Factorial(2055),0,"2",[[2054, 1]],2055, "Sym(2055)", ["A",2055, 1], "Sym"]];
44 [2, Factorial(2056),0,"2",[[2055, 1]],2056, "Sym(2056)", ["A",2056, 1], "Sym"]];
[all …]
H A Dgps6.g406 [6, Factorial(651)/2,1,"2",[[650,1]],649, "Alt(651)", ["A",651, 1], "Alt"],
407 [7, Factorial(651),0,"2",[[650, 1]],651, "Sym(651)", ["A",651, 1], "Sym"]];
410 [2, Factorial(652),0,"2",[[651, 1]],652, "Sym(652)", ["A",652, 1], "Sym"]];
413 [2, Factorial(653),0,"2",[[652, 1]],653, "Sym(653)", ["A",653, 1], "Sym"],
430 [3, Factorial(654)/2,1,"2",[[653,1]],652, "Alt(654)", ["A",654, 1], "Alt"],
431 [4, Factorial(654),0,"2",[[653, 1]],654, "Sym(654)", ["A",654, 1], "Sym"]];
434 [2, Factorial(655),0,"2",[[654, 1]],655, "Sym(655)", ["A",655, 1], "Sym"]];
437 [2, Factorial(656),0,"2",[[655, 1]],656, "Sym(656)", ["A",656, 1], "Sym"]];
605 [3, Factorial(657)/2,1,"2",[[656,1]],655, "Alt(657)", ["A",657, 1], "Alt"],
612 [2, Factorial(659),0,"2",[[658, 1]],659, "Sym(659)", ["A",659, 1], "Sym"],
[all …]
H A Dgps17.g2 [[1, Factorial(1751)/2,1,"2",[[1750,1]],1749, "Alt(1751)", ["A",1751, 1], "Alt"],
3 [2, Factorial(1751),0,"2",[[1750, 1]],1751, "Sym(1751)", ["A",1751, 1], "Sym"]];
5 [[1, Factorial(1752)/2,1,"2",[[1751,1]],1750, "Alt(1752)", ["A",1752, 1], "Alt"],
6 [2, Factorial(1752),0,"2",[[1751, 1]],1752, "Sym(1752)", ["A",1752, 1], "Sym"]];
24 [17, Factorial(1753)/2,1,"2",[[1752,1]],1751, "Alt(1753)", ["A",1753, 1], "Alt"],
25 [18, Factorial(1753),0,"2",[[1752, 1]],1753, "Sym(1753)", ["A",1753, 1], "Sym"]];
29 [3, Factorial(1754)/2,1,"2",[[1753,1]],1752, "Alt(1754)", ["A",1754, 1], "Alt"],
30 [4, Factorial(1754),0,"2",[[1753, 1]],1754, "Sym(1754)", ["A",1754, 1], "Sym"]];
34 [3, Factorial(1755)/2,1,"2",[[1754,1]],1753, "Alt(1755)", ["A",1755, 1], "Alt"],
35 [4, Factorial(1755),0,"2",[[1754, 1]],1755, "Sym(1755)", ["A",1755, 1], "Sym"]];
[all …]
H A Dgps9.g2 [[1, Factorial(851)/2,1,"2",[[850,1]],849, "Alt(851)", ["A",851, 1], "Alt"],
3 [2, Factorial(851),0,"2",[[850, 1]],851, "Sym(851)", ["A",851, 1], "Sym"]];
5 [[1, Factorial(852)/2,1,"2",[[851,1]],850, "Alt(852)", ["A",852, 1], "Alt"],
6 [2, Factorial(852),0,"2",[[851, 1]],852, "Sym(852)", ["A",852, 1], "Sym"]];
8 [[1, Factorial(853)/2,1,"2",[[852,1]],851, "Alt(853)", ["A",853, 1], "Alt"],
9 [2, Factorial(853),0,"2",[[852, 1]],853, "Sym(853)", ["A",853, 1], "Sym"],
38 [3, Factorial(854)/2,1,"2",[[853,1]],852, "Alt(854)", ["A",854, 1], "Alt"],
39 [4, Factorial(854),0,"2",[[853, 1]],854, "Sym(854)", ["A",854, 1], "Sym"]];
42 [2, Factorial(855),0,"2",[[854, 1]],855, "Sym(855)", ["A",855, 1], "Sym"]];
45 [2, Factorial(856),0,"2",[[855, 1]],856, "Sym(856)", ["A",856, 1], "Sym"]];
[all …]
H A Dgps16.g23 [22, Factorial(1601)/2,1,"2",[[1600,1]],1599, "Alt(1601)", ["A",1601, 1], "Alt"],
24 [23, Factorial(1601),0,"2",[[1600, 1]],1601, "Sym(1601)", ["A",1601, 1], "Sym"]];
28 [3, Factorial(1602)/2,1,"2",[[1601,1]],1600, "Alt(1602)", ["A",1602, 1], "Alt"],
29 [4, Factorial(1602),0,"2",[[1601, 1]],1602, "Sym(1602)", ["A",1602, 1], "Sym"]];
31 [[1, Factorial(1603)/2,1,"2",[[1602,1]],1601, "Alt(1603)", ["A",1603, 1], "Alt"],
32 [2, Factorial(1603),0,"2",[[1602, 1]],1603, "Sym(1603)", ["A",1603, 1], "Sym"]];
34 [[1, Factorial(1604)/2,1,"2",[[1603,1]],1602, "Alt(1604)", ["A",1604, 1], "Alt"],
35 [2, Factorial(1604),0,"2",[[1603, 1]],1604, "Sym(1604)", ["A",1604, 1], "Sym"]];
38 [2, Factorial(1605),0,"2",[[1604, 1]],1605, "Sym(1605)", ["A",1605, 1], "Sym"]];
41 [2, Factorial(1606),0,"2",[[1605, 1]],1606, "Sym(1606)", ["A",1606, 1], "Sym"]];
[all …]
H A Dgps8.g2 [[1, Factorial(751)/2,1,"2",[[750,1]],749, "Alt(751)", ["A",751, 1], "Alt"],
3 [2, Factorial(751),0,"2",[[750, 1]],751, "Sym(751)", ["A",751, 1], "Sym"],
40 [3, Factorial(752)/2,1,"2",[[751,1]],750, "Alt(752)", ["A",752, 1], "Alt"],
41 [4, Factorial(752),0,"2",[[751, 1]],752, "Sym(752)", ["A",752, 1], "Sym"]];
43 [[1, Factorial(753)/2,1,"2",[[752,1]],751, "Alt(753)", ["A",753, 1], "Alt"],
44 [2, Factorial(753),0,"2",[[752, 1]],753, "Sym(753)", ["A",753, 1], "Sym"]];
46 [[1, Factorial(754)/2,1,"2",[[753,1]],752, "Alt(754)", ["A",754, 1], "Alt"],
47 [2, Factorial(754),0,"2",[[753, 1]],754, "Sym(754)", ["A",754, 1], "Sym"]];
49 [[1, Factorial(755)/2,1,"2",[[754,1]],753, "Alt(755)", ["A",755, 1], "Alt"],
50 [2, Factorial(755),0,"2",[[754, 1]],755, "Sym(755)", ["A",755, 1], "Sym"]];
[all …]
H A Dgps34.g2 [[1,Factorial(3466)/2,1,"2",[ [ 3465, 1 ] ],3464,"Alt(3466)",["A",1,1],"Alt"],
3 [2,Factorial(3466),0,"2",[ [ 3465, 1 ] ],3466,"Sym(3466)",["A",2,1],"Sym"]];
9 [5,Factorial(3467)/2,1,"2",[ [ 3466, 1 ] ],3465,"Alt(3467)",["A",5,1],"Alt"],
10 [6,Factorial(3467),0,"2",[ [ 3466, 1 ] ],3467,"Sym(3467)",["A",6,1],"Sym"]];
14 [3,Factorial(3468)/2,1,"2",[ [ 3467, 1 ] ],3466,"Alt(3468)",["A",3,1],"Alt"],
15 [4,Factorial(3468),0,"2",[ [ 3467, 1 ] ],3468,"Sym(3468)",["A",4,1],"Sym"]];
41 [4,Factorial(3470),0,"2",[ [ 3469, 1 ] ],3470,"Sym(3470)",["A",4,1],"Sym"]];
44 [2,Factorial(3471),0,"2",[ [ 3470, 1 ] ],3471,"Sym(3471)",["A",2,1],"Sym"]];
47 [2,Factorial(3472),0,"2",[ [ 3471, 1 ] ],3472,"Sym(3472)",["A",2,1],"Sym"]];
50 [2,Factorial(3473),0,"2",[ [ 3472, 1 ] ],3473,"Sym(3473)",["A",2,1],"Sym"]];
[all …]
H A Dgps3.g2 [[1, Factorial(301)/2,1,"2",[[300,1]],299, "Alt(301)", ["A",301, 1], "Alt"],
3 [2, Factorial(301),0,"2",[[300, 1]],301, "Sym(301)", ["A",301, 1], "Sym"]];
5 [[1, Factorial(302)/2,1,"2",[[301,1]],300, "Alt(302)", ["A",302, 1], "Alt"],
6 [2, Factorial(302),0,"2",[[301, 1]],302, "Sym(302)", ["A",302, 1], "Sym"]];
8 [[1, Factorial(303)/2,1,"2",[[302,1]],301, "Alt(303)", ["A",303, 1], "Alt"],
9 [2, Factorial(303),0,"2",[[302, 1]],303, "Sym(303)", ["A",303, 1], "Sym"]];
11 [[1, Factorial(304)/2,1,"2",[[303,1]],302, "Alt(304)", ["A",304, 1], "Alt"],
12 [2, Factorial(304),0,"2",[[303, 1]],304, "Sym(304)", ["A",304, 1], "Sym"]];
14 [[1, Factorial(305)/2,1,"2",[[304,1]],303, "Alt(305)", ["A",305, 1], "Alt"],
15 [2, Factorial(305),0,"2",[[304, 1]],305, "Sym(305)", ["A",305, 1], "Sym"]];
[all …]
H A Dgps27.g4 [3,Factorial(2714)/2,1,"2",[ [ 2713, 1 ] ],2712,"Alt(2714)",["A",3,1],"Alt"],
5 [4,Factorial(2714),0,"2",[ [ 2713, 1 ] ],2714,"Sym(2714)",["A",4,1],"Sym"]];
7 [[1,Factorial(2715)/2,1,"2",[ [ 2714, 1 ] ],2713,"Alt(2715)",["A",1,1],"Alt"],
8 [2,Factorial(2715),0,"2",[ [ 2714, 1 ] ],2715,"Sym(2715)",["A",2,1],"Sym"]];
10 [[1,Factorial(2716)/2,1,"2",[ [ 2715, 1 ] ],2714,"Alt(2716)",["A",1,1],"Alt"],
11 [2,Factorial(2716),0,"2",[ [ 2715, 1 ] ],2716,"Sym(2716)",["A",2,1],"Sym"]];
13 [[1,Factorial(2717)/2,1,"2",[ [ 2716, 1 ] ],2715,"Alt(2717)",["A",1,1],"Alt"],
14 [2,Factorial(2717),0,"2",[ [ 2716, 1 ] ],2717,"Sym(2717)",["A",2,1],"Sym"]];
16 [[1,Factorial(2718)/2,1,"2",[ [ 2717, 1 ] ],2716,"Alt(2718)",["A",1,1],"Alt"],
17 [2,Factorial(2718),0,"2",[ [ 2717, 1 ] ],2718,"Sym(2718)",["A",2,1],"Sym"]];
[all …]

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