dailysudoku.com

David Bryant · Joined: 29 Jul 2005 Posts: 559 Location: Denver, Colorado

Hi, Matt!

AZ Matt · Posted: Tue Jun 20, 2006 6:02 pm Post subject: Thanks David!

Thanks David. I hope you are feeling better!

I wanted to make sure this technique is what is referred to as "forcing chains." I use this technique to solve all the time (this solved last Wednesday's Ruud's Daily Nightmare, though don't quote me on the exact numbers as I did the post here from a vague memory of the pattern).

I can't possibly understand why it is not considered a valid technique for solving. You have a finite set of cells from which you can deduce information with a certainty. Sometimes you only eliminate one candidate in one cell, and sometimes you solve for large groups of cells (I think 21 is my record, though only a few were critical to the solve), but it is always an outcome that is certainly correct before you commit to it.

I suppose one could argue that if you could see the whole puzzle this way, you could solve every puzzle from any point with a complicated variation of this technique. Is that the gist of the objection? If so, I don't think it is valid. I know when I pull the cells out to study them that I am going to find something -- if you can do that in your head for a whole puzzle, then God bless you.

I have been "out of the loop" for quite a while, so forgive me if I am beating a dead horse. In response to Samgj's response to my post on the "Very Hard Ugrade???", I am curious if I am in with the "masses" or the "hardcore" on this.

TKiel · Joined: 22 Feb 2006 Posts: 292 Location: Kalamazoo, MI

AZ Matt,

Marty R. · Posted: Sat Jun 24, 2006 4:47 pm Post subject:

I've been at this for about six months now and have relied heavily on forcing chains; they've been my "go-to" method. I've participated in the trial-and-error discussions and argued that forcing chains are logic as well as other techniques.

But after thinking about it over the last couple of months, I've come to understand that the people who think they're trial-and-error have some valid points. I now am not quite as quick to use the chains. I'll look first for strong links, X-Wings, coloring, etc. But if there's nothing there, I have no qualms about using the chains.

I love doing these puzzles, but let's face it: Sudoku is not up there with world peace, poverty, crime, health care, etc. It's only a game and for me, if I can find a way to solve a difficult puzzle, with or without chains, I'm happy.

Chuck B · Joined: 24 Jun 2006 Posts: 24

Interesting discussion!

Like Marty, I've been doing this for a little while and also go to forcing chains when necessary. (in my case, when the hints run out! Wink

)

This technique is akin to 'proof by contradiction' in mathematics, and its validity derives from the 'law of the excluded middle' , i.e., the proposition that an assertion must be bivalent - true or false, with no other possibility. Some mathematicians object to that 'law' and eschew proofs by contradiction (check out N. Bourbaki), but it does make some theorem proofs easier! Anyway, in a finite 'universe of discourse such as a Sudoku puzzle, every assertion about a cell must be bivalent, so proving one of those assertions by contradiction - i.e., forcing chains - is logically sound.

I think that Nishio goes hand in glove with this technique to eliminate dead ends... it's basically a tree search, which can be as messy or as orderly as the solver wishes to be.

IMHO, arguments against either technique are based on aesthetics more than logic, and grounded in the natural 'feel' of a sighted species for visual cues. We usually associate beauty with pleasing geometric structure but, as in math, there is also a kind of abstract beauty in logical structures that cannot be pictured literally. Implication chains fall into that category for me, and their attractiveness lies in structure that transcends geometry, even though it triggers the same kind of right-brain activity in me. Finding one might not be as much 'fun' (to some) as an XY-wing, but there can be just as much sense of accomplishment in solving the puzzle through these techniques.

Anyway, that's my take on it. YMMV, naturally! Smile

Cheers!
Chuck

AZ Matt · Posted: Thu Jul 06, 2006 11:29 pm Post subject:

Just to be clear to TKiel; by saying "Assume that 1 must be in...", I didn't mean to imply I was guessing. It was just a way to shorten the code -- i.e., it was true, I just wanted you to trust me for the sake of simplicity.

And as Chuck B suggested, I use those grids a lot. And no matter how much some one tries to convince me it is trial and error, it isn't. Like I said, I know when I start a grid I am going to find something. I have to work on a way to describe it -- an imbalance? an anomaly?

TKiel · Joined: 22 Feb 2006 Posts: 292 Location: Kalamazoo, MI

AZ Matt,

I'm a believer in the logic of forcing chains, even though I'm not too much of a user, so no need to explain your wording. I was trying to point out some of the objections I've heard others make about whether or not forcing chains should be considered T&E and that's why I used your quote as an example. A monkey can be trained to recognize patterns and pick them out of a puzzle but to take something that is merely a concept and apply it to a particular puzzle in such a way that makes a proof seems to me to be the essence of logic.

Well, I'm off the pick fleas off my mate, climb trees and eat bananas.

George Woods · Joined: 28 Mar 2006 Posts: 304 Location: Dorset UK

In the example that started this discussion, the elimination of the 1 was described as a forcing chain.

Many forcing chains can be turned into what I think is an XY chain. specifically for the example 14-46-68-81. I consider this as a "pure" chain since it consists of strongly linked doublets (XY). a pure XY wing is an XY chain with only 3 elements e.g. if the 68 had been 48 we would have the shorter chain 14-48-81 which is a pure xy wing.

The difficulty for me arises either if the chain is very long or when the chain is kept going via some of the other forms of strong linking e.g. an 8 in col8 of box3 means the 8 in box 9 must lie in such and such a cell and so on!

Doing it by trial and error seems to be the most unloved method. It can be fun though, searching for the failed case and trying to find the shortest forcing chain - I suppose ultimately trial and error allows any soluble sudoku to be solved given enough time - and an effective eraser!

For me the test of "trial and error"or " clever logic" is whether I can see it without using a pencil!

ukodus · Joined: 02 Aug 2008 Posts: 2 Location: London

Commenting on the factors that do not appeal in the apparent trial and error nature of forcing chains, or in looking for the shortest chain, I am reminded of those quadratic equations in algebra in which you tried various [from a limited set of] combinations before getting to the right factors for the particular expression, e.g. to establish that 2x+4y and -6x+10y are the factors of -12x² - 4xy - 40y², you will probably try a few combinations before you get there. I have never worked much with forcing chains in sudoku, but am about to give it more of a try.
This is my first posting here, and I wonder whether any more experienced sudoku-ists have posted some sort of handbook here not only on the language & terminology used, but also on how you move into solving the more fiendish levels of puzzles, out of what might be called the more 'amateur' levels, that I feel I'm sticking my head up out of (!) at last.

Marty R. · Posted: Sun Aug 03, 2008 12:08 am Post subject:

Welcome to the forum.

Maybe this terminology list will be helpful.

http://www.sudopedia.org/wiki/Terminology

ukodus · Joined: 02 Aug 2008 Posts: 2 Location: London

Thanks for the sudopedia link, Marty. At first glance I think it'll keep me busy!