The linear system for Sudoku and a fractional completion threshold
Abstract
We study a system of linear equations associated with Sudoku latin squares. The coefficient matrix M of the normal system has various symmetries arising from Sudoku. From this, we find the eigenvalues and eigenvectors of M, and compute a generalized inverse. Then, using linear perturbation methods, we obtain a fractional completion guarantee for sufficiently large and sparse rectangular-box Sudoku puzzles.
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