Publication at Faculty of Mathematics and Physics |
2020
Abstract
A division sudoku is a latin square whose all six conjugates are sudoku squares. We enumerate division sudokus up to a suitable equivalence, introduce powerful invariants of division sudokus, and also study latin squares that are division sudokus with respect to multiple partitions at the same time.
We use nearfields and affine geometry to construct division sudokus of prime power rank that are rich in sudoku partitions.