Analysis of xx-ph-01365693-14_01-base.sdk

Contents

Original Sudoku

level: very deep

Original Sudoku

position: 98.7..6..7.5....8..........64.8...9...3.6.........2..647.6....8...4..9......1.74. initial

Autosolve

position: 98.7..6..7.5....8..........64.8...9...3.6.........2..647.6....8...4..96.....1.74. autosolve
Autosolve

Pair Reduction Variants

Deep Constraint Pair Analysis

Deep Constraint Pair Analysis

Deep Constraint Pair Analysis

Deep Constraint Pair Analysis

Deep Constraint Pair Analysis

Deep Constraint Pair Analysis

Deep Constraint Pair Analysis

Deep Constraint Pair Analysis

Deep Constraint Pair Analysis

Deep Constraint Pair Analysis

Deep Constraint Pair Analysis

Deep Constraint Pair Analysis

Deep Constraint Pair Analysis

Deep Constraint Pair Analysis

Deep Constraint Pair Analysis

Deep Constraint Pair Analysis

Time used: 0:00:00.000006

List of important HDP chains detected for C4,C6: 7..:

* DIS # C4: 7 # E3: 3,5 => CTR => E3: 2,4,8,9
* CNT   1 HDP CHAINS /  36 HYP OPENED

See Appendix: Full HDP Chains for full list of HDP chains.

Very Deep Constraint Pair Analysis

Very Deep Constraint Pair Analysis

Time used: 0:01:01.920370

List of important HDP chains detected for C4,C6: 7..:

* DIS # C4: 7 # E3: 3,5 => CTR => E3: 2,4,8,9
* DIS # C4: 7 + E3: 2,4,8,9 # F4: 3,5 # E1: 2,3 => CTR => E1: 4,5
* DIS # C4: 7 + E3: 2,4,8,9 # F4: 3,5 + E1: 4,5 # E2: 2,3 => CTR => E2: 4,9
* DIS # C4: 7 + E3: 2,4,8,9 # F4: 3,5 + E1: 4,5 + E2: 4,9 # D3: 2,3 => CTR => D3: 5
* DIS # C4: 7 + E3: 2,4,8,9 # F4: 3,5 + E1: 4,5 + E2: 4,9 + D3: 5 => CTR => F4: 1
* DIS # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 9 # B2: 1,3 => CTR => B2: 2,6
* DIS # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 9 + B2: 2,6 # B3: 1,3 => CTR => B3: 2,6
* DIS # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 9 + B2: 2,6 + B3: 2,6 => CTR => D6: 3,5
* PRF # C4: 7 + E3: 2,4,8,9 + F4: 1 + D6: 3,5 # G4: 3,5 # E1: 3,5 => SOL
* STA # C4: 7 + E3: 2,4,8,9 + F4: 1 + D6: 3,5 # G4: 3,5 + E1: 3,5
* CNT   9 HDP CHAINS /  84 HYP OPENED

See Appendix: Full HDP Chains for full list of HDP chains.

Details

This sudoku is very deep. Here is some information that may be helpful on how to proceed.

Positions

98.7..6..7.5....8..........64.8...9...3.6.........2..647.6....8...4..9......1.74. initial
98.7..6..7.5....8..........64.8...9...3.6.........2..647.6....8...4..96.....1.74. autosolve

Classification

level: very deep

Pairing Analysis

--------------------------------------------------
* CONSTRAINT PAIRS (AUTO SOLVE)
C1,C3: 4.. / C1 = 4  =>  0 pairs (_) / C3 = 4  =>  1 pairs (_)
F5,E6: 4.. / F5 = 4  =>  0 pairs (_) / E6 = 4  =>  0 pairs (_)
E6,G6: 4.. / E6 = 4  =>  0 pairs (_) / G6 = 4  =>  0 pairs (_)
F2,F3: 6.. / F2 = 6  =>  0 pairs (_) / F3 = 6  =>  0 pairs (_)
B9,C9: 6.. / B9 = 6  =>  0 pairs (_) / C9 = 6  =>  0 pairs (_)
B2,F2: 6.. / B2 = 6  =>  0 pairs (_) / F2 = 6  =>  0 pairs (_)
C3,C9: 6.. / C3 = 6  =>  0 pairs (_) / C9 = 6  =>  0 pairs (_)
H3,I3: 7.. / H3 = 7  =>  0 pairs (_) / I3 = 7  =>  0 pairs (_)
C4,C6: 7.. / C4 = 7  =>  3 pairs (_) / C6 = 7  =>  1 pairs (_)
E8,F8: 7.. / E8 = 7  =>  1 pairs (_) / F8 = 7  =>  0 pairs (_)
E3,F3: 8.. / E3 = 8  =>  0 pairs (_) / F3 = 8  =>  1 pairs (_)
G5,G6: 8.. / G5 = 8  =>  0 pairs (_) / G6 = 8  =>  1 pairs (_)
A5,G5: 8.. / A5 = 8  =>  1 pairs (_) / G5 = 8  =>  0 pairs (_)
E3,E8: 8.. / E3 = 8  =>  0 pairs (_) / E8 = 8  =>  1 pairs (_)
I2,I3: 9.. / I2 = 9  =>  0 pairs (_) / I3 = 9  =>  0 pairs (_)
* DURATION: 0:00:10.192985  START: 03:25:36.108809  END: 03:25:46.301794 2020-10-05
* CP COUNT: (15)
* INCONCLUSIVE

--------------------------------------------------
* DEEP CONSTRAINT PAIRS (PAIR REDUCTION)
C4,C6: 7.. / C4 = 7 ==>  3 pairs (_) / C6 = 7 ==>  1 pairs (_)
E3,E8: 8.. / E3 = 8 ==>  0 pairs (_) / E8 = 8 ==>  1 pairs (_)
A5,G5: 8.. / A5 = 8 ==>  1 pairs (_) / G5 = 8 ==>  0 pairs (_)
G5,G6: 8.. / G5 = 8 ==>  0 pairs (_) / G6 = 8 ==>  1 pairs (_)
E3,F3: 8.. / E3 = 8 ==>  0 pairs (_) / F3 = 8 ==>  1 pairs (_)
E8,F8: 7.. / E8 = 7 ==>  1 pairs (_) / F8 = 7 ==>  0 pairs (_)
C1,C3: 4.. / C1 = 4 ==>  0 pairs (_) / C3 = 4 ==>  1 pairs (_)
I2,I3: 9.. / I2 = 9 ==>  0 pairs (_) / I3 = 9 ==>  0 pairs (_)
H3,I3: 7.. / H3 = 7 ==>  0 pairs (_) / I3 = 7 ==>  0 pairs (_)
C3,C9: 6.. / C3 = 6 ==>  0 pairs (_) / C9 = 6 ==>  0 pairs (_)
B2,F2: 6.. / B2 = 6 ==>  0 pairs (_) / F2 = 6 ==>  0 pairs (_)
B9,C9: 6.. / B9 = 6 ==>  0 pairs (_) / C9 = 6 ==>  0 pairs (_)
F2,F3: 6.. / F2 = 6 ==>  0 pairs (_) / F3 = 6 ==>  0 pairs (_)
E6,G6: 4.. / E6 = 4 ==>  0 pairs (_) / G6 = 4 ==>  0 pairs (_)
F5,E6: 4.. / F5 = 4 ==>  0 pairs (_) / E6 = 4 ==>  0 pairs (_)
* DURATION: 0:01:01.312908  START: 03:25:46.302418  END: 03:26:47.615326 2020-10-05
* REASONING C4,C6: 7..
* DIS # C4: 7 # E3: 3,5 => CTR => E3: 2,4,8,9
* CNT   1 HDP CHAINS /  36 HYP OPENED
* DCP COUNT: (15)
* INCONCLUSIVE

--------------------------------------------------
* VERY DEEP CONSTRAINT PAIRS (PAIR REDUCTION, RECURSIVE)
C4,C6: 7.. / C4 = 7 ==>  0 pairs (*) / C6 = 7  =>  0 pairs (X)
* DURATION: 0:01:01.919295  START: 03:26:47.778002  END: 03:27:49.697297 2020-10-05
* REASONING C4,C6: 7..
* DIS # C4: 7 # E3: 3,5 => CTR => E3: 2,4,8,9
* DIS # C4: 7 + E3: 2,4,8,9 # F4: 3,5 # E1: 2,3 => CTR => E1: 4,5
* DIS # C4: 7 + E3: 2,4,8,9 # F4: 3,5 + E1: 4,5 # E2: 2,3 => CTR => E2: 4,9
* DIS # C4: 7 + E3: 2,4,8,9 # F4: 3,5 + E1: 4,5 + E2: 4,9 # D3: 2,3 => CTR => D3: 5
* DIS # C4: 7 + E3: 2,4,8,9 # F4: 3,5 + E1: 4,5 + E2: 4,9 + D3: 5 => CTR => F4: 1
* DIS # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 9 # B2: 1,3 => CTR => B2: 2,6
* DIS # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 9 + B2: 2,6 # B3: 1,3 => CTR => B3: 2,6
* DIS # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 9 + B2: 2,6 + B3: 2,6 => CTR => D6: 3,5
* PRF # C4: 7 + E3: 2,4,8,9 + F4: 1 + D6: 3,5 # G4: 3,5 # E1: 3,5 => SOL
* STA # C4: 7 + E3: 2,4,8,9 + F4: 1 + D6: 3,5 # G4: 3,5 + E1: 3,5
* CNT   9 HDP CHAINS /  84 HYP OPENED
* VDCP COUNT: (1)
* SOLUTION FOUND

Header Info

1365693;14_01;GP;24;11.50;1.20;1.20

Appendix: Full HDP Chains

A1. Deep Constraint Pair Analysis

Full list of HDP chains traversed for C4,C6: 7..:

* INC # C4: 7 # F4: 3,5 => UNS
* INC # C4: 7 # D6: 3,5 => UNS
* INC # C4: 7 # G4: 3,5 => UNS
* INC # C4: 7 # I4: 3,5 => UNS
* INC # C4: 7 # E1: 3,5 => UNS
* DIS # C4: 7 # E3: 3,5 => CTR => E3: 2,4,8,9
* INC # C4: 7 + E3: 2,4,8,9 # E7: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # E8: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # F4: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # D6: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # G4: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # I4: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # E1: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # E7: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # E8: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # I5: 4,7 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # I5: 1,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # F4: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # D6: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # G4: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # I4: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # E1: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # E7: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # E8: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # I5: 4,7 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # I5: 1,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 => UNS
* INC # C6: 7 # A5: 1,2 => UNS
* INC # C6: 7 # B5: 1,2 => UNS
* INC # C6: 7 # G4: 1,2 => UNS
* INC # C6: 7 # I4: 1,2 => UNS
* INC # C6: 7 # C1: 1,2 => UNS
* INC # C6: 7 # C3: 1,2 => UNS
* INC # C6: 7 # C7: 1,2 => UNS
* INC # C6: 7 # C8: 1,2 => UNS
* INC # C6: 7 => UNS
* CNT  36 HDP CHAINS /  36 HYP OPENED

Full list of HDP chains traversed for E3,E8: 8..:

* INC # E8: 8 # C7: 1,2 => UNS
* INC # E8: 8 # A8: 1,2 => UNS
* INC # E8: 8 # B8: 1,2 => UNS
* INC # E8: 8 # I8: 1,2 => UNS
* INC # E8: 8 # I8: 3,5 => UNS
* INC # E8: 8 # C1: 1,2 => UNS
* INC # E8: 8 # C3: 1,2 => UNS
* INC # E8: 8 # C4: 1,2 => UNS
* INC # E8: 8 => UNS
* INC # E3: 8 => UNS
* CNT  10 HDP CHAINS /  10 HYP OPENED

Full list of HDP chains traversed for A5,G5: 8..:

* INC # A5: 8 # B5: 1,5 => UNS
* INC # A5: 8 # B6: 1,5 => UNS
* INC # A5: 8 # D6: 1,5 => UNS
* INC # A5: 8 # H6: 1,5 => UNS
* INC # A5: 8 # A8: 1,5 => UNS
* INC # A5: 8 # A8: 2,3 => UNS
* INC # A5: 8 => UNS
* INC # G5: 8 => UNS
* CNT   8 HDP CHAINS /   8 HYP OPENED

Full list of HDP chains traversed for G5,G6: 8..:

* INC # G6: 8 # B5: 1,5 => UNS
* INC # G6: 8 # B6: 1,5 => UNS
* INC # G6: 8 # D6: 1,5 => UNS
* INC # G6: 8 # H6: 1,5 => UNS
* INC # G6: 8 # A8: 1,5 => UNS
* INC # G6: 8 # A8: 2,3 => UNS
* INC # G6: 8 => UNS
* INC # G5: 8 => UNS
* CNT   8 HDP CHAINS /   8 HYP OPENED

Full list of HDP chains traversed for E3,F3: 8..:

* INC # F3: 8 # C7: 1,2 => UNS
* INC # F3: 8 # A8: 1,2 => UNS
* INC # F3: 8 # B8: 1,2 => UNS
* INC # F3: 8 # I8: 1,2 => UNS
* INC # F3: 8 # I8: 3,5 => UNS
* INC # F3: 8 # C1: 1,2 => UNS
* INC # F3: 8 # C3: 1,2 => UNS
* INC # F3: 8 # C4: 1,2 => UNS
* INC # F3: 8 => UNS
* INC # E3: 8 => UNS
* CNT  10 HDP CHAINS /  10 HYP OPENED

Full list of HDP chains traversed for E8,F8: 7..:

* INC # E8: 7 # F4: 3,5 => UNS
* INC # E8: 7 # D6: 3,5 => UNS
* INC # E8: 7 # E6: 3,5 => UNS
* INC # E8: 7 # G4: 3,5 => UNS
* INC # E8: 7 # I4: 3,5 => UNS
* INC # E8: 7 # E1: 3,5 => UNS
* INC # E8: 7 # E7: 3,5 => UNS
* INC # E8: 7 => UNS
* INC # F8: 7 => UNS
* CNT   9 HDP CHAINS /   9 HYP OPENED

Full list of HDP chains traversed for C1,C3: 4..:

* INC # C3: 4 # B2: 1,2 => UNS
* INC # C3: 4 # A3: 1,2 => UNS
* INC # C3: 4 # B3: 1,2 => UNS
* INC # C3: 4 # H1: 1,2 => UNS
* INC # C3: 4 # I1: 1,2 => UNS
* INC # C3: 4 # C4: 1,2 => UNS
* INC # C3: 4 # C7: 1,2 => UNS
* INC # C3: 4 # C8: 1,2 => UNS
* INC # C3: 4 => UNS
* INC # C1: 4 => UNS
* CNT  10 HDP CHAINS /  10 HYP OPENED

Full list of HDP chains traversed for I2,I3: 9..:

* INC # I2: 9 => UNS
* INC # I3: 9 => UNS
* CNT   2 HDP CHAINS /   2 HYP OPENED

Full list of HDP chains traversed for H3,I3: 7..:

* INC # H3: 7 => UNS
* INC # I3: 7 => UNS
* CNT   2 HDP CHAINS /   2 HYP OPENED

Full list of HDP chains traversed for C3,C9: 6..:

* INC # C3: 6 => UNS
* INC # C9: 6 => UNS
* CNT   2 HDP CHAINS /   2 HYP OPENED

Full list of HDP chains traversed for B2,F2: 6..:

* INC # B2: 6 => UNS
* INC # F2: 6 => UNS
* CNT   2 HDP CHAINS /   2 HYP OPENED

Full list of HDP chains traversed for B9,C9: 6..:

* INC # B9: 6 => UNS
* INC # C9: 6 => UNS
* CNT   2 HDP CHAINS /   2 HYP OPENED

Full list of HDP chains traversed for F2,F3: 6..:

* INC # F2: 6 => UNS
* INC # F3: 6 => UNS
* CNT   2 HDP CHAINS /   2 HYP OPENED

Full list of HDP chains traversed for E6,G6: 4..:

* INC # E6: 4 => UNS
* INC # G6: 4 => UNS
* CNT   2 HDP CHAINS /   2 HYP OPENED

Full list of HDP chains traversed for F5,E6: 4..:

* INC # F5: 4 => UNS
* INC # E6: 4 => UNS
* CNT   2 HDP CHAINS /   2 HYP OPENED

A2. Very Deep Constraint Pair Analysis

Full list of HDP chains traversed for C4,C6: 7..:

* INC # C4: 7 # F4: 3,5 => UNS
* INC # C4: 7 # D6: 3,5 => UNS
* INC # C4: 7 # G4: 3,5 => UNS
* INC # C4: 7 # I4: 3,5 => UNS
* INC # C4: 7 # E1: 3,5 => UNS
* DIS # C4: 7 # E3: 3,5 => CTR => E3: 2,4,8,9
* INC # C4: 7 + E3: 2,4,8,9 # E7: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # E8: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # F4: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # D6: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # G4: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # I4: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # E1: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # E7: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # E8: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # I5: 4,7 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # I5: 1,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # F4: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # D6: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # G4: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # I4: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # E1: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # E7: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # E8: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # I5: 4,7 => UNS
* INC # C4: 7 + E3: 2,4,8,9 # I5: 1,5 => UNS
* DIS # C4: 7 + E3: 2,4,8,9 # F4: 3,5 # E1: 2,3 => CTR => E1: 4,5
* DIS # C4: 7 + E3: 2,4,8,9 # F4: 3,5 + E1: 4,5 # E2: 2,3 => CTR => E2: 4,9
* DIS # C4: 7 + E3: 2,4,8,9 # F4: 3,5 + E1: 4,5 + E2: 4,9 # D3: 2,3 => CTR => D3: 5
* DIS # C4: 7 + E3: 2,4,8,9 # F4: 3,5 + E1: 4,5 + E2: 4,9 + D3: 5 => CTR => F4: 1
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 9 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # G4: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # I4: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # E1: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # E7: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # E8: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 5,9 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # B5: 5,9 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # B5: 1,2 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # I5: 4,7 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # I5: 1,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 # G4: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 # I4: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 # E1: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 # E7: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 # E8: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 # I5: 4,7 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 # I5: 1,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 # G6: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 # H6: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 # D3: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 # D9: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 # G4: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 # I4: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 # E1: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 # E7: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 # E8: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 # I5: 4,7 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 # I5: 1,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 # G6: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 # H6: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 # D3: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 # D9: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 3,5 => UNS
* DIS # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 9 # B2: 1,3 => CTR => B2: 2,6
* DIS # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 9 + B2: 2,6 # B3: 1,3 => CTR => B3: 2,6
* DIS # C4: 7 + E3: 2,4,8,9 + F4: 1 # D6: 9 + B2: 2,6 + B3: 2,6 => CTR => D6: 3,5
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 + D6: 3,5 # G4: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 + D6: 3,5 # I4: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 + D6: 3,5 # E1: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 + D6: 3,5 # E7: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 + D6: 3,5 # E8: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 + D6: 3,5 # I5: 4,7 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 + D6: 3,5 # I5: 1,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 + D6: 3,5 # G6: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 + D6: 3,5 # H6: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 + D6: 3,5 # D3: 3,5 => UNS
* INC # C4: 7 + E3: 2,4,8,9 + F4: 1 + D6: 3,5 # D9: 3,5 => UNS
* PRF # C4: 7 + E3: 2,4,8,9 + F4: 1 + D6: 3,5 # G4: 3,5 # E1: 3,5 => SOL
* STA # C4: 7 + E3: 2,4,8,9 + F4: 1 + D6: 3,5 # G4: 3,5 + E1: 3,5
* CNT  82 HDP CHAINS /  84 HYP OPENED