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Main Author: Solecki, Sławomir
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2503.14825
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author Solecki, Sławomir
author_facet Solecki, Sławomir
contents We explore connections between stellar moves on simplicial complexes (these are fundamental operations of combinatorial topology) and projective Fra{ï}ss{é} limits (this is a model theoretic construction with topological applications). We identify a class of simplicial maps that arise from the stellar moves of welding and subdividing. We call these maps weld-division maps. The core of the paper is the proof that the category of weld-division maps fulfills the projective amalgamation property. This gives an example of an amalgamation class that substantially differs from known classes. The weld-division amalgamation class naturally gives rise to a projective Fra{ï}ss{é} class. We compute the canonical limit of this projective Fra{ï}ss{é} class and its canonical quotient space. This computation gives a combinatorial description of the geometric realization of a simplicial complex and an example of a combinatorially defined projective Fra{ï}ss{é} class whose canonical quotient space has topological dimension strictly bigger than $1$. The method of proof of the amalgamation theorem is new. It is not geometric or topological, but rather it consists of combinatorial calculations performed on finite sequences of finite sets and functions among such sequences. Set theoretic nature of the entries of the sequences is crucial to the arguments.
format Preprint
id arxiv_https___arxiv_org_abs_2503_14825
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Simplicial complexes, stellar moves, and projective amalgamation
Solecki, Sławomir
Combinatorics
Algebraic Geometry
Logic
05E45, 03E75, 05D10, 14E05
We explore connections between stellar moves on simplicial complexes (these are fundamental operations of combinatorial topology) and projective Fra{ï}ss{é} limits (this is a model theoretic construction with topological applications). We identify a class of simplicial maps that arise from the stellar moves of welding and subdividing. We call these maps weld-division maps. The core of the paper is the proof that the category of weld-division maps fulfills the projective amalgamation property. This gives an example of an amalgamation class that substantially differs from known classes. The weld-division amalgamation class naturally gives rise to a projective Fra{ï}ss{é} class. We compute the canonical limit of this projective Fra{ï}ss{é} class and its canonical quotient space. This computation gives a combinatorial description of the geometric realization of a simplicial complex and an example of a combinatorially defined projective Fra{ï}ss{é} class whose canonical quotient space has topological dimension strictly bigger than $1$. The method of proof of the amalgamation theorem is new. It is not geometric or topological, but rather it consists of combinatorial calculations performed on finite sequences of finite sets and functions among such sequences. Set theoretic nature of the entries of the sequences is crucial to the arguments.
title Simplicial complexes, stellar moves, and projective amalgamation
topic Combinatorics
Algebraic Geometry
Logic
05E45, 03E75, 05D10, 14E05
url https://arxiv.org/abs/2503.14825