Optimal Triangulation of Regular Simplicial Sets
Abstract
The Barratt nerve, denoted , is the endofunctor that takes a simplicial set to the nerve of the poset of its non-degenerate simplices. The ordered simplicial complex , namely the Barratt nerve of the Kan subdivision , is a triangulation of the original simplicial set in the sense that there is a natural map whose geometric realization is homotopic to some homeomorphism. This is a refinement to the result that any simplicial set can be triangulated. A simplicial set is said to be regular if each of its non-degenerate simplices is embedded along its -th face. That is a triangulation of is a consequence of the fact that the Kan subdivision makes simplicial sets regular and that is a triangulation of whenever is regular. In this paper, we argue that , interpreted as a functor from regular to non-singular simplicial sets, is not just any triangulation, but in fact the best. We mean this in the sense that is the left Kan extension of barycentric subdivision along the Yoneda embedding.
Cite
@article{arxiv.2001.04339,
title = {Optimal Triangulation of Regular Simplicial Sets},
author = {Vegard Fjellbo},
journal= {arXiv preprint arXiv:2001.04339},
year = {2020}
}