Litcius/Paper detail

Lattice gauge theories in the presence of a linear gauge-symmetry breaking

Claudio Bonati, Andrea Pelissetto, Ettore Vicari

2021Physical review. E22 citationsDOIOpen Access PDF

Abstract

We study the effects of gauge-symmetry breaking (GSB) perturbations in three-dimensional lattice gauge theories with scalar fields. We study this issue at transitions in which gauge correlations are not critical and the gauge symmetry only selects the gauge-invariant scalar degrees of freedom that become critical. A paradigmatic model in which this behavior is realized is the lattice CP^{1} model or, more generally, the lattice Abelian-Higgs model with two-component complex scalar fields and compact gauge fields. We consider this model in the presence of a linear GSB perturbation. The gauge symmetry turns out to be quite robust with respect to the GSB perturbation: the continuum limit is gauge invariant also in the presence of a finite small GSB term. We also determine the phase diagram of the model. It has one disordered phase and two phases that are tensor and vector ordered, respectively. They are separated by continuous transition lines, which belong to the O(3), O(4), and O(2) vector universality classes, and which meet at a multicritical point. We remark that the behavior at the CP^{1} gauge-symmetric critical point substantially differs from that at transitions in which gauge correlations become critical, for instance at transitions in the noncompact lattice Abelian-Higgs model that are controlled by the charged fixed point: in this case, the behavior is extremely sensitive to GSB perturbations.

Topics & Concepts

PhysicsHamiltonian lattice gauge theoryMulticritical pointQuantum gauge theoryGauge anomalyLattice gauge theorySupersymmetric gauge theorySpontaneous symmetry breakingGauge theoryIntroduction to gauge theoryGauge symmetryMathematical physicsLattice field theoryGauge bosonTheoretical physicsSymmetry breakingGauge fixingQuantum mechanicsPhase diagramPhase (matter)Theoretical and Computational PhysicsPhysics of Superconductivity and MagnetismQuantum many-body systems