dailysudoku.com

[Marty R.]

This was the "Tough" puzzle from sudoku.com.au for February 13.

As published:

[David Bryant]

Hi, Marty! This is an interesting puzzle.

[Steve R]

A slightly different approach to the next two steps is:

(a) eliminate 5 from r2c1 using the finned X-Wing in rows 1 and 5 (which leaves possibles as (79)) and
(b) use the XY-Wing pivoted on r2c1 with pincers in cells r6c1 and r2c8 to eliminate 4 from r6c8.
There is then only one place for 4 in row 6 and the rest is routine.

Steve

[Marty R.]

[Marty R.]

[Marty R.]

Three hours after my previous reply, it was solved with a couple of forcing chains. Thanks again for the little push.

[Steve R]

Sorry Marty: of course you didn’t understand it.

The story is this. Studying the puzzle and drafting my note took some time. When I came to post it, David had already answered so I scrubbed my effort. Then I thought it might be worth sending anyway, retrieved it, amended it slightly and sent it. The flaw in the procedure was retrieving the wrong note from the recycle bin. What I thought I sent was:

A slightly different approach to the next two steps is:

(a) eliminate 7 from r4c9 using the finned X-Wing in columns 3 and 8 (which leaves possibles as (19)) and
(b) use the XY-Wing pivoted on r9c9 with pincers in cells r7c8 and r4c9 to eliminate 1 from r45c8.
There is then only one place for 1 in column 8.

As for fins, an illustration may be of interest. Start with a normal X-Wing based on columns:

… A … C …
…………….
…………….
… B … D …

A and B are the only cells which may admit an entry, X, in the left-hand column; similarly for cells C and D in the right-hand column.

Now imagine cell C replaced by boxC, the box which contains cell C. Thus the left hand column still has only two places for X and they still line up with the column to the right. It is just that one of the “places” for X in the right hand column is three cells lined up in a box rather than a single cell.

Logic:
(1) Either cell A or cell B contains X.
(2) If cell A contains X, X cannot be placed in the intersection of row AC and boxC.
(3) If cell B contains X, then D cannot and the X in boxC lies in column CD.
(4) Whichever of (2) and (3) applies, X can be excluded from two cells in boxC. These cells comprise the intersection of row AC and boxC excluding cell C itself.

The pattern is less useful than an X-Wing but, if you look for X-Wings at all, you will spot the finned version just as easily. Incidentally, any m x m fish can have a fin (where m = 2 is an X-Wing, m = 3 a swordfish, etc). By coincidence a finned swordfish can be applied later in the same puzzle.

Steve

[Marty R.]

Thanks Steve, for clearing that up. I've printed out your reply, as I did David's, and will pore over it to see what I can learn.