dailysudoku.com

[tlanglet]

[nataraj]

Indeed an interesting puzzle!

I resisted the UR temptation (although the 59 UR was interesting - I'd not use it as a type 1 but use the strong link on 9 in col 2 instead) and (again not using a rather unspectacular w-wing 24-24) hit the mother lode: skyscraper "4" rows 3 and 9. It removes 9 from r2c5, sets r3c4=4, and that solves the puzzle

edit: oops, I forgot to mention the xyz-wing (245 in row 3 and box 3). I thought it did not do much but it does in fact remove a 4 from r3 and thus enables the skyscraper!

[cgordon]

Firstly, I appreciate these "Other Puzzle" posts - I gotta have my daily sudoku fix.
This was a good one. I didn't resist the UR temptation - used 3 of them incl a Type 4 on <49> - plus an xy wing.

[Marty R.]

Nataraj,

I think you already know this, since you pioneered it, but there is less contrast when it's part of a quote.

No quote:

skyscraper "4" rows 3 and 9. It removes 9 from r2c5, sets r3c4=4, and that solves the puzzle

edit: oops, I forgot to mention the xyz-wing (245 in row 3 and box 3). I thought it did not do much but it does in fact remove a 4 from r3 and thus enables the skyscraper!

With quote:

[nataraj]

I knew that there was a difference between odd-numbered and even-numbered posts (because of the darker and lighter backgrounds) and that the darker backgrounds were more of a problem.

Nifty idea to use [quote] to make sure there is a white background ...

[tlanglet]

I solved the puzzle twice; with and without the three URs. The existence of the three URs at the same time immediately after completing basics was interesting to me, plus that two of them provided deletions in the same cell.

Ted

[keith]

Maybe this is just another of my dumb ideas. (I really hope it is not one of my unoriginal dumb ideas!)

Is there such a thing as a finned XY-wing?

The puzzle of this thread:

[tlanglet]

Keith,

Your solution to this puzzle is elegant!

However, I am lost in your comparison of an xyz-wing to a finned xy-wing. In the chain XZ-XYZ-YZ, I think of XYZ as the pivot that "sees" both pincers, XZ and YZ. However in this puzzle it is one of the pincers that has the extra Z candidate. I seem to be missing a basic concept at this point.

Ted

[keith]

Ted,

My XYZ-wing example is not present in the situation I discuss in this puzzle.

What I mean by a "finned" XY-wing is that you can have an XY-wing:

XZ-XY-YZ.

The "fin" is an extra value on any one of the three cells:

VXZ-XY-YZ,

XZ-VXY-YZ, or

XZ-XY-VYZ.

Either the XY-wing is true, or "V" is true.

V = Z only makes sense in the second case, XZ-XYZ-YX, which is an XYZ-wing.

The XY-wing eliminates "Z" in all cells (maximum four) that see XZ and YZ. The XYZ-wing eliminates "Z" in only the cells (maximum two) that see XZ, XYZ, and YZ.

The reasoning of this finned XY-wing is much more like a BUG+2: Either A is true in one cell, (and/) or B is true in another cell. If they both lead to the same truth, or to the same contradiction, you can advance the puzzle.

"Elegant"? Thank you, but I think the jury is still out. (Let's hope they are not "12 Angry Men", a classic I watched with my son the other night.)

[Now, you see what I do with my idle time on Sundays when there is no NASCAR race. Even the replays of the IRL Danica Patrick cat fight only occupied me for a few minutes. Watching Greg Norman not win was, as Yogi Berra said, like deja-vu, all over again.]

Keith

[Marty R.]

[Asellus]

[nataraj]

[keith]

[Asellus]

[ravel]

I did like Asellus' elimination (while i needed some time to see Keith's placement of the 8's).

For me the finned xy-wing (or a finned w-wing) is something similar to a "useless" xyz-wing (one of 3 numbers must be x) or a UR with 3 extra candidates.
Here we have "either the fin must be true or one of 2 numbers must be x". Can we conclude something usefull from that ?

Its hard to say, if the chances are really better, than to start with the numbers of a trivalue cell or the 3 occurrences of a number in a unit. Probably yes, if there are cells with x, which would be eliminated by the xy- or w-wing.

The other thing is, that you might find them, when you look for the wings. So why not test them immediately ? I always check, if i can use UR's with up to 3 extra candidates (or "outside" positions of the UR digits) in harder puzzles.

I have tried another of the grids here and it took me hardly longer to look for finned xy-wings than for xy-wings alone. But i only found one, which did not lead to an elimination.

[keith]