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Main Authors: Majid, Shahn, Simão, Francisco
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2503.17301
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author Majid, Shahn
Simão, Francisco
author_facet Majid, Shahn
Simão, Francisco
contents We study gauge theory with finite group $G$ on a graph $X$ using noncommutative differential geometry and Hopf algebra methods with $G$-valued holonomies replaced by gauge fields valued in a `finite group Lie algebra' subset of the group algebra $\mathbb{C} G$ corresponding to the complete graph differential structure on $G$. We show that this richer theory decomposes as a product over the nontrivial irreducible representations $ρ$ with dimension $d_ρ$ of certain noncommutative $U(d_ρ)$-Yang-Mills theories, which we introduce. The Yang-Mills action recovers the Wilson action for a lattice but now with additional terms. We compute the moduli space $\mathcal{A}^\times / \mathcal{G}$ of regular connections modulo gauge transformations on connected graphs $X$. For $G$ Abelian, this is given as expected by phases associated to fundamental loops but with additional $\mathbb{R}_{>0}$-valued modes on every edge resembling the metric for quantum gravity models on graphs. For nonAbelian $G$, these modes become positive-matrix valued modes. We study the quantum gauge field theory in the Abelian case in a functional integral approach, particularly for $X$ the finite chain $A_{n+1}$, the $n$-gon $\mathbb{Z}_n$ and the single plaquette $\mathbb{Z}_2\times \mathbb{Z}_2$. We show that, in stark contrast to usual lattice gauge theory, the Lorentzian version is well-behaved, and we identify novel boundary vs bulk effects in the case of the finite chain. We also consider gauge fields valued in the finite-group Lie algebra corresponding to a general Cayley graph differential calculus on $G$, where we study an obstruction to closure of gauge transformations.
format Preprint
id arxiv_https___arxiv_org_abs_2503_17301
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Finite group gauge theory on graphs and gravity-like modes
Majid, Shahn
Simão, Francisco
High Energy Physics - Theory
High Energy Physics - Lattice
We study gauge theory with finite group $G$ on a graph $X$ using noncommutative differential geometry and Hopf algebra methods with $G$-valued holonomies replaced by gauge fields valued in a `finite group Lie algebra' subset of the group algebra $\mathbb{C} G$ corresponding to the complete graph differential structure on $G$. We show that this richer theory decomposes as a product over the nontrivial irreducible representations $ρ$ with dimension $d_ρ$ of certain noncommutative $U(d_ρ)$-Yang-Mills theories, which we introduce. The Yang-Mills action recovers the Wilson action for a lattice but now with additional terms. We compute the moduli space $\mathcal{A}^\times / \mathcal{G}$ of regular connections modulo gauge transformations on connected graphs $X$. For $G$ Abelian, this is given as expected by phases associated to fundamental loops but with additional $\mathbb{R}_{>0}$-valued modes on every edge resembling the metric for quantum gravity models on graphs. For nonAbelian $G$, these modes become positive-matrix valued modes. We study the quantum gauge field theory in the Abelian case in a functional integral approach, particularly for $X$ the finite chain $A_{n+1}$, the $n$-gon $\mathbb{Z}_n$ and the single plaquette $\mathbb{Z}_2\times \mathbb{Z}_2$. We show that, in stark contrast to usual lattice gauge theory, the Lorentzian version is well-behaved, and we identify novel boundary vs bulk effects in the case of the finite chain. We also consider gauge fields valued in the finite-group Lie algebra corresponding to a general Cayley graph differential calculus on $G$, where we study an obstruction to closure of gauge transformations.
title Finite group gauge theory on graphs and gravity-like modes
topic High Energy Physics - Theory
High Energy Physics - Lattice
url https://arxiv.org/abs/2503.17301