Analysis of xx-ph-00001060-H54-base.sdk
Contents
Original Sudoku
level: deep
position: .......39.....1.....3.9...5..9.6...81....2....7.4.......6.8..5..2.7..6..4.....8.. initial
Autosolve
position: .......39.....1.....3.9...5..9.6...81....2....7.4.......6.8..5..2.7..6..4.....8.. autosolve
Pair Reduction Variants
Deep Constraint Pair Analysis
Time used: 0:00:00.000015
List of important HDP chains detected for D2,E2: 3..:
* DIS # E2: 3 # C6: 8 => CTR => C6: 2,5 * DIS # E2: 3 + C6: 2,5 # F4: 3 => CTR => F4: 5,7 * DIS # E2: 3 + C6: 2,5 + F4: 5,7 # G5: 5,7 => CTR => G5: 3,4 * DIS # E2: 3 + C6: 2,5 + F4: 5,7 + G5: 3,4 => CTR => E2: 2,4,5,7 * STA E2: 2,4,5,7 * CNT 4 HDP CHAINS / 15 HYP OPENED
List of important HDP chains detected for D4,E6: 1..:
* DIS # E6: 1 # F4: 3,5 => CTR => F4: 7 * PRF # E6: 1 + F4: 7 # G4: 3,5 => SOL * STA # E6: 1 + F4: 7 + G4: 3,5 * CNT 2 HDP CHAINS / 5 HYP OPENED
See Appendix: Full HDP Chains for full list of HDP chains.
Details
This sudoku is deep. Here is some information that may be helpful on how to proceed.
Positions
| .......39.....1.....3.9...5..9.6...81....2....7.4.......6.8..5..2.7..6..4.....8.. | initial |
| .......39.....1.....3.9...5..9.6...81....2....7.4.......6.8..5..2.7..6..4.....8.. | autosolve |
Classification
level: deep
Pairing Analysis
-------------------------------------------------- * PAIRS (2) D5: 8,9 F6: 8,9 -------------------------------------------------- * CONSTRAINT PAIRS (AUTO SOLVE) D4,E6: 1.. / D4 = 1 => 3 pairs (_) / E6 = 1 => 4 pairs (_) D2,E2: 3.. / D2 = 3 => 3 pairs (_) / E2 = 3 => 9 pairs (_) B5,A6: 6.. / B5 = 6 => 2 pairs (_) / A6 = 6 => 2 pairs (_) D9,F9: 6.. / D9 = 6 => 3 pairs (_) / F9 = 6 => 2 pairs (_) F4,E5: 7.. / F4 = 7 => 3 pairs (_) / E5 = 7 => 3 pairs (_) A7,C9: 7.. / A7 = 7 => 3 pairs (_) / C9 = 7 => 3 pairs (_) H2,H3: 8.. / H2 = 8 => 2 pairs (_) / H3 = 8 => 3 pairs (_) D5,F6: 8.. / D5 = 8 => 3 pairs (_) / F6 = 8 => 1 pairs (_) A8,C8: 8.. / A8 = 8 => 3 pairs (_) / C8 = 8 => 8 pairs (_) A2,B2: 9.. / A2 = 9 => 3 pairs (_) / B2 = 9 => 3 pairs (_) D5,F6: 9.. / D5 = 9 => 1 pairs (_) / F6 = 9 => 3 pairs (_) * DURATION: 0:00:09.685357 START: 18:19:05.060864 END: 18:19:14.746221 2020-11-24 * CP COUNT: (11) * INCONCLUSIVE -------------------------------------------------- * DEEP CONSTRAINT PAIRS (PAIR REDUCTION) D2,E2: 3.. / D2 = 3 => 3 pairs (_) / E2 = 3 ==> 0 pairs (X) A8,C8: 8.. / A8 = 8 ==> 3 pairs (_) / C8 = 8 ==> 8 pairs (_) D4,E6: 1.. / D4 = 1 => 0 pairs (X) / E6 = 1 ==> 0 pairs (*) * DURATION: 0:00:52.813161 START: 18:19:15.683486 END: 18:20:08.496647 2020-11-24 * REASONING D2,E2: 3.. * DIS # E2: 3 # C6: 8 => CTR => C6: 2,5 * DIS # E2: 3 + C6: 2,5 # F4: 3 => CTR => F4: 5,7 * DIS # E2: 3 + C6: 2,5 + F4: 5,7 # G5: 5,7 => CTR => G5: 3,4 * DIS # E2: 3 + C6: 2,5 + F4: 5,7 + G5: 3,4 => CTR => E2: 2,4,5,7 * STA E2: 2,4,5,7 * CNT 4 HDP CHAINS / 15 HYP OPENED * REASONING D4,E6: 1.. * DIS # E6: 1 # F4: 3,5 => CTR => F4: 7 * PRF # E6: 1 + F4: 7 # G4: 3,5 => SOL * STA # E6: 1 + F4: 7 + G4: 3,5 * CNT 2 HDP CHAINS / 5 HYP OPENED * DCP COUNT: (3) * SOLUTION FOUND
Header Info
1060;H54;col;21;11.30;11.30;3.40
Appendix: Full HDP Chains
A1. Deep Constraint Pair Analysis
Full list of HDP chains traversed for D2,E2: 3..:
* INC # E2: 3 # C6: 2,5 => UNS * DIS # E2: 3 # C6: 8 => CTR => C6: 2,5 * INC # E2: 3 + C6: 2,5 # G4: 2,5 => UNS * INC # E2: 3 + C6: 2,5 # G4: 1,7 => UNS * INC # E2: 3 + C6: 2,5 # A1: 2,5 => UNS * INC # E2: 3 + C6: 2,5 # A2: 2,5 => UNS * INC # E2: 3 + C6: 2,5 # I5: 3,6 => UNS * INC # E2: 3 + C6: 2,5 # I5: 4,7 => UNS * INC # E2: 3 + C6: 2,5 # I6: 3,6 => UNS * INC # E2: 3 + C6: 2,5 # I6: 1,2 => UNS * INC # E2: 3 + C6: 2,5 # F4: 5,7 => UNS * DIS # E2: 3 + C6: 2,5 # F4: 3 => CTR => F4: 5,7 * DIS # E2: 3 + C6: 2,5 + F4: 5,7 # G5: 5,7 => CTR => G5: 3,4 * DIS # E2: 3 + C6: 2,5 + F4: 5,7 + G5: 3,4 => CTR => E2: 2,4,5,7 * INC E2: 2,4,5,7 # D2: 3 => UNS * STA E2: 2,4,5,7 * CNT 15 HDP CHAINS / 15 HYP OPENED
Full list of HDP chains traversed for A8,C8: 8..:
* INC # C8: 8 # B1: 6,8 => UNS * INC # C8: 8 # B2: 6,8 => UNS * INC # C8: 8 # B3: 6,8 => UNS * INC # C8: 8 # B4: 4,5 => UNS * INC # C8: 8 # B4: 3 => UNS * INC # C8: 8 # G5: 4,5 => UNS * INC # C8: 8 # G5: 3,7,9 => UNS * INC # C8: 8 # C1: 4,5 => UNS * INC # C8: 8 # C2: 4,5 => UNS * INC # C8: 8 # A1: 6,8 => UNS * INC # C8: 8 # A2: 6,8 => UNS * INC # C8: 8 # A3: 6,8 => UNS * INC # C8: 8 # A4: 2,5 => UNS * INC # C8: 8 # A4: 3 => UNS * INC # C8: 8 # G6: 2,5 => UNS * INC # C8: 8 # G6: 1,3,9 => UNS * INC # C8: 8 # C1: 2,5 => UNS * INC # C8: 8 # C2: 2,5 => UNS * INC # C8: 8 # E6: 1,5 => UNS * INC # C8: 8 # E6: 3 => UNS * INC # C8: 8 # G4: 1,5 => UNS * INC # C8: 8 # G4: 2,4,7 => UNS * INC # C8: 8 # D9: 1,5 => UNS * INC # C8: 8 # D9: 2,6,9 => UNS * INC # C8: 8 # E5: 5,7 => UNS * INC # C8: 8 # E5: 3 => UNS * INC # C8: 8 # G4: 5,7 => UNS * INC # C8: 8 # G4: 1,2,4 => UNS * INC # C8: 8 # F1: 5,7 => UNS * INC # C8: 8 # F1: 4,6,8 => UNS * INC # C8: 8 => UNS * INC # A8: 8 # B9: 1,5 => UNS * INC # A8: 8 # C9: 1,5 => UNS * INC # A8: 8 # E8: 1,5 => UNS * INC # A8: 8 # E8: 3,4 => UNS * INC # A8: 8 # C1: 1,5 => UNS * INC # A8: 8 # C1: 2,4,7,8 => UNS * INC # A8: 8 => UNS * CNT 38 HDP CHAINS / 38 HYP OPENED
Full list of HDP chains traversed for D4,E6: 1..:
* DIS # E6: 1 # F4: 3,5 => CTR => F4: 7 * INC # E6: 1 + F4: 7 # A4: 3,5 => UNS * INC # E6: 1 + F4: 7 # B4: 3,5 => UNS * PRF # E6: 1 + F4: 7 # G4: 3,5 => SOL * STA # E6: 1 + F4: 7 + G4: 3,5 * CNT 4 HDP CHAINS / 5 HYP OPENED