Universal Structure of Graph Product Kernels
Group Theory
2026-05-11 v1 Algebraic Topology
Abstract
Let be a graph product over a finite simplicial graph , and let denote the kernel of the canonical homomorphism from to the direct product of its vertex groups. It is known that, up to isomorphism, depends only on the underlying graph and the cardinalities of the vertex groups. In this paper we establish a functorial refinement of this fact. We show that any collection of set maps between the vertex groups naturally induces a homomorphism between the corresponding kernels, and that this construction is functorial. Several applications are discussed.
Cite
@article{arxiv.2605.07853,
title = {Universal Structure of Graph Product Kernels},
author = {Ian J. Leary and Nansen Petrosyan},
journal= {arXiv preprint arXiv:2605.07853},
year = {2026}
}
Comments
21 pages. Intended for publication in the proceedings of "Geometry and Topology of Polyhedral Complexes" conference in celebration of Mike Davis' 75th birthday