On Subtilings of Polyomino Tilings

Abstract

We consider a problem concerning tilings of rectangular regions by a finite library of polyominoes. We specifically look at rectangular regions of dimension n× m and ask whether or not a tiling of this region can be rearranged so that tiling of the n× m rectangle can be realized as a tiling of an n× m' rectangle and an n× m" rectangle, m=m'+m". We call this a subtiling. We show that the associated decision problem is NP-complete when restricted to rectangular polyominoes. We also show that for certain finite libraries of polyominoes, if m is sufficiently large, a subtiling always exists and give bounds.