NP-completeness of Tiling Finite Simply Connected Regions with a Fixed Set of Wang Tiles

Abstract

The computational complexity of tiling finite simply connected regions with a fixed set of tiles is studied in this paper. We show that the problem of tiling simply connected regions with a fixed set of 23 Wang tiles is NP-complete. As a consequence, the problem of tiling simply connected regions with a fixed set of 111 rectangles is NP-complete. Our results improve that of Igor Pak and Jed Yang by using fewer numbers of tiles. Notably in the case of Wang tiles, the number has decreased by more than one third from 35 to 23.

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