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Analysis of < U2, F2, L2, R2 >
------------------------------
Level Positions
0 1
1 4
2 11
3 30
4 82
5 224
6 589
7 1,484
8 3,649
9 8,488
10 18,424
11 34,890
12 47,802
13 36,757
14 12,360
15 1,067
16 26
-------
165,888
Analysis of the 3x3x3 squares group
-----------------------------------
branching
Moves Deep arrangements (h only) factor loc max (h only)
0 1 -- 0
1 6 6 0
2 27 4.5 0
3 120 4.444 0
4 519 4.325 0
5 1,932 3.722 0
6 6,484 3.356 1 (6 X pattern)
7 20,310 3.132 0
8 55,034 2.709 65
9 113,892 2.069 1,482
10 178,495 1.567 7,379
11 179,196 1.004 25,980
12 89,728 0.501 50,320
13 16,176 0.180 11,328
14 1,488 0.092 912
15 144 0.096 144
------- ------
663,552 97,611
Analysis of the 3x3x3 squares group (5 generators)
--------------------------------------------------
Moves Deep arrangements (h only)
0 1
1 5
2 18
3 64
4 223
5 726
6 2,360
7 7,315
8 21,619
9 57,283
10 130,243
11 207,350
12 171,907
13 58,469
14 5,353
15 564
16 52
-------
663,552
Analysis of the 3x3x3 <U, R> group
----------------------------------
ML's Conjecture: The < U, R > group is >=20 turns deep in qt metric
Now confirmed, Sept 1, 1994
branching
Moves Deep arrangements (q only) factor
0 1 --
1 4 4
2 10 2.5
3 24 2.4
4 58 2.416
5 140 2.413
6 338 2.414
7 816 2.414
8 1,970 2.414
9 4,756 2.414
10 11,448 2.407
11 27,448 2.401
12 65,260 2.378
13 154,192 2.363
14 360,692 2.339
15 827,540 2.294
16 1,851,345 2.237
17 3,968,840 2.144
18 7,891,990 1.988
19 13,659,821 1.755
20 18,471,682 1.352
21 16,586,822 0.898
22 8,039,455 0.485
23 1,511,110 0.188
24 47,351 0.031
25 87 0.002
----------
73,483,200
Moves Deep arrangements (q+h) total
0 1 1
1 6 7
2 18 25
3 54 79
4 162 241
5 486 727
6 1,457 2,184
7 4,360 6,544
8 13,016 19,560
9 38,482 58,042
10 113,094 171,136
11 328,920 500,056
12 942,351 1,442,407
13 2,616,973 4,059,380
14 6,774,848 10,834,228
15 15,105,592 25,939,820
16 24,231,019 50,170,839
17 19,421,274 69,592,113
18 3,843,568 73,435,681
19 47,465 73,483,146
20 54 73,483,200
Analysis of 3x3x3 corners only
------------------------------
Moves Deep arrangements (q+h) arrangements (q only) * loc max (q only)
0 1 1 0
1 18 12 0
2 243 114 0
3 2,874 924 0
4 28,000 6,539 0
5 205,416 39,528 0
6 1,168,516 199,926 114
7 5,402,628 806,136 600
8 20,776,176 2,761,740 17,916
9 45,391,616 8,656,152 10,200
10 15,139,616 22,334,112 35,040
11 64,736 32,420,448 818,112
12 18,780,864 9,654,240
13 2,166,720 2,127,264
14 6,624 6,624
---------- ---------- ----------
88,179,840 88,179,840 11,870,110
Analysis of 3x3x3 edges only using q turns
------------------------------------------
Distance Number of Branching Number of Branching
from M-Conjugate Factor M-Conjugate Factor
Start Classes Classes
Without With
Centers Centers
0 1 1
1 1 1.00 1 1.00
2 5 5.00 5 5.00
3 25 5.00 25 5.00
4 215 8.60 215 8.60
5 1,860 8.65 1,886 8.77
6 16,481 8.86 16,902 8.96
7 144,334 8.76 150,442 8.90
8 1,242,992 8.61 1,326,326 8.81
9 10,324,847 8.31 11,505,339 8.67
10 76,993,295 7.46 96,755,918 8.40
11 371,975,385 4.83 750,089,528 7.75
12 382,690,120 1.03 ....
13 8,235,392 0.02 work
14 54 0.00 in
15 1 0.02 progress
-----------
Total 851,625,008
Posted to Yahoo by Tom Rokicki on Jan 2, 2004
Dist Positions Unique wrt M Unique wrt M+inv
0 1 1 1
1 12 1 1
2 114 5 5
3 1,068 25 17
4 9,819 215 128
5 89,392 1,886 986
6 807,000 16,902 8,652
7 7,209,384 150,442 75,740
8 63,624,107 1,326,326 665,398
9 552,158,812 11,505,339 5,759,523
10 4,643,963,023 96,755,918 48,408,203
11 36,003,343,336 750,089,528 375,164,394
12 208,075,583,101 4,334,978,635 2,167,999,621
13 441,790,281,226 9,204,132,452 4,603,365,303
14 277,713,627,518 5,785,844,935 2,894,003,596
15 12,144,555,140 253,044,012 126,739,897
16 23,716 750 677
17 30 3 3
18 1 1 1
--------------- ------------- --------------
980,995,276,800 20,437,847,376 10,222,192,146
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