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!

"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