On the equation of state of U(1) lattice gauge theory in three   dimensions

Michele Caselle; Alessandro Mariani; Marco Panero; Antonio Smecca

arXiv:2501.16185·hep-lat·March 21, 2025

On the equation of state of U(1) lattice gauge theory in three dimensions

Michele Caselle, Alessandro Mariani, Marco Panero, Antonio Smecca

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TL;DR

This paper investigates the equation of state of 3D compact U(1) lattice gauge theory through numerical simulations, analyzing its spectrum, continuum limit, and comparing with non-Abelian theories to enhance understanding of its physical properties.

Contribution

It provides new numerical insights into the equation of state of 3D U(1) gauge theory and discusses its implications and connections with non-Abelian gauge theories.

Findings

01

Numerical results on the equation of state of 3D U(1) gauge theory

02

Comparison with non-Abelian gauge theories

03

Discussion on the continuum limit behavior

Abstract

We study the equation of state of three-dimensional compact U(1) gauge theory on the lattice by means of numerical simulations, and discuss the implications of our results for the spectrum of the theory, in connection with previous results from the literature. We also compare our findings to the case of non-Abelian gauge theories and comment on the continuum limit.

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Taxonomy

TopicsSpectral Theory in Mathematical Physics · Quantum Chromodynamics and Particle Interactions · Numerical methods for differential equations