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I have a project to do for a complexity and problem solving course, and I've decided to base the project on Sudoku. From the research I've done, Sudoku is an NP-Complete problem (which is required for the project), and I've found a few ways of creating algorithms for it. I'm planning on doing a brute force solving method, and I need to do two other methods. I've found some ways, such as solving it as an Exact Cover problem, and I've found a paper that describes Sudoku as a SAT problem. But my question is this: Is there a proven polynomial solution for Sudoku? My teacher seems to think there was a "clever" solution by a "senior" gentleman about 5 years ago, but that's all he can remember. Does anybody know what this solution is, or what any other polynomial solution is? I'd appreciate any information or tips.

Thanks!

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Brute force is about polynomial as it can get. (there can be some pruning, though) –  wildplasser Mar 28 '13 at 20:20
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NP-Complete means there is (probably) no solution that scales polynomially with the size of the input. But, sudoku only has one input size, so what does that even mean here? –  BlueRaja - Danny Pflughoeft Mar 28 '13 at 20:39
    
Ah, ok, the more general problem of sudoku-like puzzles is NP-Complete. From here: "The general problem of solving Sudoku puzzles on n2 × n2 boards of n × n blocks is known to be NP-complete. For n=3 (classical Sudoku), however, this result is of little relevance: algorithms such as Dancing Links can solve puzzles in fractions of a second." –  BlueRaja - Danny Pflughoeft Mar 28 '13 at 20:44
    
Thanks for the answers guys. Well the paper I mentioned about Sudoku as a SAT problem is located here: trac.assembla.com/disenosudoku/export/2/docs/SudokuAsSAT.pdf It's an interesting paper, though the authors themselves claim that the method is "experimental". They claim that a Sudoku puzzle can be polynomial if there is a unique solution to the puzzle. The only way it can be unique is if enough of the puzzle cells are "pre-filled", like the puzzle comes. I just wasn't sure if there were any other poly solutions (whether this SAT one is legitimate or not) –  derekahc Mar 30 '13 at 2:56

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You may also use human-like strategy, which can be polynomial, but it will not find solution for all sudokus (even those with unique solution). It is also really easy to reduce sudoku to graph-coloring problem (each cell is represented by a node of a graph, nodes are connected according to the rules of sudoku, in order not to have the same color. Prefilled nodes are grounded to some color).

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