# How can I find all solutions(count) of a sudoku game within 1 sec?

I've tried dancing links and some other search algorithms but it won't work within the given time limit of 1 second. For a sudoku game with about 1 million solutions it takes about 10 seconds to count all solutions.

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Think very fast? –  Hot Licks Jul 8 '12 at 11:30
(language==undefined)//return true; –  user1432124 Jul 8 '12 at 11:34
1 second for 1 million results leaves you ~1000 operations per result. With lean&mean coding that should be doable, if you don't waste too much time on the non-results. ( --> pruning ) –  wildplasser Jul 8 '12 at 11:39

1M results sounds a bit scary, but for fast solving basically you have to use process of elimination / constraint propagation and exhaustive search on fields with the least possible values.

An excellent article from Peter Norvig: Solving Every Sudoku Puzzle.

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Standard solving algorithms for Sudoku (all solutions) use backtracking. Classic variant of Sudoku has only one solution (or at least should have), so there you might use human-like techniques, but this is in the case not possible. So backtracking will be probably the only way.

But you might want to use several tricks

• Prunning of the tree (extend basic prunnign strategy of backtracking algorithm with more sophisticated conditions)
• Massive parallelism (I think that that you might benefit of superlinear accelaration of the solution, because some sub-problems might be the same, hence solvable only once, or might prune some branches of other threads)
• Use symmetry and some special properties of your setting, this is probably the best strategy, if you have some implicit knowledge
• You might try some blackbox approaches - for example constraint (logic) programming, which are highly optimized in searching in massive search space...
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In prunning, it costs much more time to determine whether continue searching or just backtrack –  Poligun Jul 9 '12 at 7:18