Complexity of Interlocking Polyominoes
Combinatorics
2011-12-20 v1
Abstract
Polyominoes are a subset of polygons which can be constructed from integer-length squares fused at their edges. A system of polygons P is interlocked if no subset of the polygons in P can be removed arbitrarily far away from the rest. It is already known that polyominoes with four or fewer squares cannot interlock. It is also known that determining the interlockedness of polyominoes with an arbitrary number of squares is PSPACE hard. Here, we prove that a system of polyominoes with five or fewer squares cannot interlock, and that determining interlockedness of a system of polyominoes including hexominoes (polyominoes with six squares) or larger polyominoes is PSPACE hard.
Keywords
Cite
@article{arxiv.1112.4087,
title = {Complexity of Interlocking Polyominoes},
author = {Sidharth Dhawan and Zachary Abel},
journal= {arXiv preprint arXiv:1112.4087},
year = {2011}
}
Comments
18 pages, 15 figures