bonsoir andré,
je suis ravi que cette grille t'ait ramené sur le forum; voici ce que j'avais trouvé :
Parcours classique suivi de :
- gratte-ciel des 2 c4c9-d4d79 => f9 ≠ 2
- Gratte-ciel des 7 c8c4-h8h456 => g4, i4 ≠7, i4=9
_|__a_______b_________c__|__d______e_______f___|___g_______h_______i
1|_2a7A___2A7a_______9__|__1______6________8__|__3________4______5
2|_35t8y____1_______3b6B_|__4_____3c9C___35T9_|_67d8Y9î___2_____6d7D
3|_35T8___36b8z_______4__|__7_____2P39__2p35t9_|_6B89_____8e9E____1
4|__6_____234S7____2ô37k_|_2f3F____8____1o237x_|_14s5V____135v7___9
5|_1l3r7w___9_________8__|__6______5________4__|_1g7G_____13R7____2
6|_1L237__234s7_______5__|__9_____1m2p3_1237X_|_14S6d78e_1378E____6D7d
7|_2q7J8h9â__5________1__|_2h8H_____4______2i9I_|_7j9J_______6_______3
8|_3789Â___378Z____3k7K_|_35U8h__1M39ê____6__|__2_____1m5u7J9____4
9|__4_______236B__2Ô36b_|_2q35u____7_____1m39_|_1n5v9____159______8
1) Interdit dj (7 g2g7) Jw (7 a7a5) Wd (7 i6gh5) => d faux, i2=7, i6=6
2) Interdit mj (h8) jG (7 g5g7) gO (1 g5gh4) om (1 e6f4) => m faux, e8=1, f2, f3 ≠ 9, e6=23=d4
_|__a_______b_________c__|__d______e_______f___|___g_______h_______i
1|_2a7A___2A7a_______9__|__1______6________8__|__3________4______5
2|_35t8y____1_______3b6B_|__4_____3c9C____3t5T_|_6b8Y9c___2______7
3|_35T8___36b8z_______4__|__7_____2f39c__2F35t_|_6B89____8e9E____1
4|__6_____234S7___2m37k_|_2f3F____8______1X7x_|_14s5V____135v7___9
5|_1l3r7w___9_________8__|__6______5________4__|_1g7G_____13R7____2
6|_1L237__234s7_______5__|__9_____2F3f____1x7X_|_14S78e__1378E____6
7|_2q7J8h9â__5________1__|_2h8H_____4______2f9F_|_7j9J_______6______3
8|_3789Â___378Z____3k7K_|_3d5U8h__1________6__|__2______5u7J9â____4
9|__4_______236B__2M36b_|_2q35u____7______3F9f_|_1n5v9___1N59_____8
3) Interdit xg ((1 gh4g5) Gj (7 g5g7) JK (7 a7c8) kx (7 c4f4) => x faux, f4=1, f6=7, g4=4s5S (V=S) => sn su
4) OU : 9 de h9 ni E ni N [eS (g6) sn (5 g9d9)] supprimé => 9e en h8 => â=e ;
La fusion donne âF (9 a7f7) fc (3 e2e6) =âc=ec et âF fm (2 d4c4) Mb (c9) =âb=eb
5) Interdit cE (9 e3h3) ec => c faux, e2=9, 9e en g3 => Be
6) Interdit eB (g3) be => e faux, h3=9, h6=8, a8=9 ;
RI 35 f2(35)-f3-a3-a2 avec les 5 jumeaux en rectangle => a3 ≠ 3
_|__a_______b_________c__|__d______e_______f___|___g_______h_______i
1|_2a7A___2A7a_______9__|__1______6________8__|__3________4______5
2|_35t8b____1_______3b6B_|__4______9______3t5T_|_6b8B______2______7
3|_5T8t___36b8h_______4__|__7_____2f3F___2F35t_|_6B8b______9______1
4|__6_____234S7___2m37k_|_2f3F____8________1__|_4s5S_____35s7w___9
5|_1s3r7w___9_________8__|__6______5________4__|_1F7f_____1n3R7___2
6|_1S23___234s________5__|__9_____2F3f_______7_|_1s4S______8______6
7|_2q7f8h____5________1__|_2h8H____4______2f9F_|_7F9f_______6_____3
8|__9______378H____3k7K_|_3d5f8h___1________6__|__2______5F7f____4
9|__4_______236B__2M36b_|_2q35F____7______3F9f_|_1n5s9F___1N5n___8
7) Interdit qF ((d9) fq (a7) => q faux, a7, d9 ≠ 2
8) Interdit dF (3 d8d4) fd (d8) => d faux, d8 ≠ 3
_|__a_______b_________c__|__d______e_______f___|___g_______h_______i
1|_2a7A___2A7a_______9__|__1______6________8__|__3________4______5
2|_35t8b____1_______3b6B_|__4______9______3t5T_|_6b8B______2______7
3|_5T8t___3t6b8F_______4__|__7_____2f3F___2F35t_|_6B8b______9______1
4|__6_____234S7____2b37k_|_2f3F____8________1__|_4s5S_____3r5s7w___9
5|_1s3r7w___9_________8__|__6______5________4__|_1F7f_____1n3R7___2
6|_1S2A3___234s_______5__|__9_____2F3f_______7_|_1s4S______8______6
7|_7f8F______5________1__|_2F8f_____4______2f9F_|_7F9f______6______3
8|__9______3K78f___3k7K_|_5f8F_____1________6__|__2______5F7f_____4
9|__4______2b6B____2B6b_|_3f5F_____7______3F9f_|_1n5s9F___1N5n___8
9) Interdit AF (2 a6e6) fA (7 a7a1) => A faux, a1=2, X-wing des 7 ag57 => h5 ≠ 7, a6=1S3s => fs
10) Interdit sf (3 a6e6) Fs (1 g5a5) => s faux, a6=1, b4=4, g4=5, g6=4, XY-wing b8 (38)-a7 (78) - a5 (37) => b6 ≠ 3, b6=2, c9=2, etc. au bout.
A+