dailysudoku.com

[tlanglet]

I wanted to practice using ALSs, so I tried this Vanhegan Extreme. After a couple of hours work, I have a solution.

Maybe others would like to give it a go. I am heading for the Scotch

[daj95376]

This is not a solution to the puzzle. It's just my mentioning a pattern that recently caught my attention while investigating chains of three strong links with only two values.

[storm_norm]

Danny,
its the cyclops move.
has the single bi-value cell in the middle of the chain.

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on the not so typical side of things we have some BUG-lite logic.

[tlanglet]

As noted when I posted this puzzle, I was specifically looking for ALS steps to solve the puzzle. So I found three ALS steps but used other moves to complete the puzzle.

ALS 134 in r12c5 provides the strong inference between the 3 and 4s: ALS134[(4)r2c5 = (3)r12c5]r12c5 - (3=6)r3c4 - (6=9)r5c4 - (9=4)r4c4; r4c5<>4.

Next, is the ALS 479 in r48c4 that provides the strong inference between the 7 and 9s: (1=3)r1c5 - (3=6)r3c4 - (6=9)r5c4 - ALS479[(9)r48c4 = (7)r8c4]r48c4 - (7=1)r8c7; r1c7<>1.

ALS A: 369 in r35c4
ALS B: 12349 in r1289c5
The "shared exclusive" digit is 3 located in box2
The "shared common" digit is 9
The deleted 9s are in r456c5 & r8c4

At this point, all three ALSs that I found did not appear to have a useful impact on solving the puzzle so I started looking for other steps.

Flightless xyz-wing 247 in r7c6
(2)r7c6 - (2=4)r4c6 - r2c6 = r2c5; r8c5<>4,
(4)r7c6; r8c5<>4,
(7)r7c6 - (7=4)r8c4; r8c5<>4.

6-cell DP (or a BUG-lite per Norm) 58 in r457c578 provides a strong inference: DP58[(1)r5c5 = (9)r5c8]r457c578 - (9=5)r6c8 - (5=1)r6c3; r6c56<>1 to complete the puzzle.

I hindsight, the initial LAS, the flightless xyz-wing and the DP58 are sufficient to complete the puzzle.

Ted