Parametrized Complexity of Expansion Height
Abstract
Deciding whether two simplicial complexes are homotopy equivalent is a fundamental problem in topology, which is famously undecidable. There exists a combinatorial refinement of this concept, called simple-homotopy equivalence: two simplicial complexes are of the same simple-homotopy type if they can be transformed into each other by a sequence of two basic homotopy equivalences, an elementary collapse and its inverse, an elementary expansion. In this article we consider the following related problem: given a 2-dimensional simplicial complex, is there a simple-homotopy equivalence to a 1-dimensional simplicial complex using at most p expansions? We show that the problem, which we call the erasability expansion height, is W[P]-complete in the natural parameter p.
Keywords
Cite
@article{arxiv.1910.09228,
title = {Parametrized Complexity of Expansion Height},
author = {Ulrich Bauer and Abhishek Rathod and Jonathan Spreer},
journal= {arXiv preprint arXiv:1910.09228},
year = {2019}
}
Comments
15 pages, 2 figures