English

Algorithmic solvability of the lifting-extension problem

Algebraic Topology 2016-10-10 v4 Computational Geometry

Abstract

Let XX and YY be finite simplicial sets (e.g. finite simplicial complexes), both equipped with a free simplicial action of a finite group GG. Assuming that YY is dd-connected and dimX2d\dim X\le 2d, for some d1d\geq 1, we provide an algorithm that computes the set of all equivariant homotopy classes of equivariant continuous maps XY|X|\to|Y|; the existence of such a map can be decided even for dimX2d+1\dim X\leq 2d+1. For fixed GG and dd, the algorithm runs in polynomial time. This yields the first algorithm for deciding topological embeddability of a kk-dimensional finite simplicial complex into Rn\mathbb{R}^n under the conditions k23n1k\leq\frac 23 n-1. More generally, we present an algorithm that, given a lifting-extension problem satisfying an appropriate stability assumption, computes the set of all homotopy classes of solutions. This result is new even in the non-equivariant situation.

Keywords

Cite

@article{arxiv.1307.6444,
  title  = {Algorithmic solvability of the lifting-extension problem},
  author = {Martin Čadek and Marek Krčál and Lukáš Vokřínek},
  journal= {arXiv preprint arXiv:1307.6444},
  year   = {2016}
}

Comments

54 pages

R2 v1 2026-06-22T00:57:07.841Z