Flip graph and arc complex finite rigidity
Abstract
A subcomplex of a cell complex is called \emph{rigid} with respect to another cell complex if every injective simplicial map has a unique extension to an injective simplicial map . We say that a cell complex exhibits \emph{finite rigidity} if it contains a finite rigid subcomplex. Given a surface with marked points, its \textit{flip graph} and \textit{arc complex} are simplicial complexes indexing the triangulations and the arcs between marked points, respectively. In this paper, we leverage the fact that the flip graph can be embedded in the arc complex as its dual to show that finite rigidity of the flip graph implies finite rigidity of the arc complex. Thus, a recent result of the second author on the finite rigidity of the flip graph implies finite rigidity of the arc complex for a broad class of surfaces. Notably, this includes surfaces with boundary -- a setting where finite rigidity of the arc complex was previously unknown.
Cite
@article{arxiv.2310.04211,
title = {Flip graph and arc complex finite rigidity},
author = {Chandrika Sadanand and Emily Shinkle},
journal= {arXiv preprint arXiv:2310.04211},
year = {2025}
}
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5 pages