Spontaneous Breaking of Lorentz Symmetry and Vertex Operators for Vortices

TL;DR

This paper reviews spontaneous Lorentz symmetry breaking in gauge theories, constructs vertex operators for creating and shifting vortex states with specific charges and angular momentum, and explores their effects on particle statistics, including boson-fermion transmutation.

Contribution

It introduces a novel family of vertex operators that generate and manipulate vortex states with quantized charge and angular momentum, revealing their impact on particle statistics.

Findings

Vertex operators create and shift vortex winding numbers.

Operators alter angular momentum of vortices and composites.

Vertex operators can change statistics between bosons, fermions, and anyons.

Abstract

We first review the spontaneous Lorentz symmetry breaking in the presence of massless gauge fields and infraparticles. This result was obtained long time ago in the context of rigorious quantum field theory by Frohlich et. al. and reformulated by Balachandran and Vaidya using the notion of superselection sectors and direction-dependent test functions at spatial infinity for the non-local observables. Inspired by these developments and under the assumption that the spectrum of the electric charge is quantized, (in units of a fundamental charge e) we construct a family of vertex operators which create winding number k, electrically charged Abelian vortices from the vacuum (zero winding number sector) and/or shift the winding number by k units. In particular, we find that for rotating vortices the vertex operator at level k shifts the angular momentum of the vortex by k \frac{{\tilde q}}{q}, where \tilde q is the electric charge of the quantum state of the vortex and q is the charge of the vortex scalar field under the U(1) gauge field. We also show that, for charged-particle-vortex composites angular momentum eigenvalues shift by k \frac{{\tilde q}}{q}, {\tilde q} being the electric charge of the charged-particle-vortex composite. This leads to the result that for \frac{{\tilde q}}{q} half-odd integral and for odd k our vertex operators flip the statistics of charged-particle-vortex composites from bosons to fermions and vice versa. For fractional values of \frac{{\tilde q}}{q}, application of vertex operator on charged-particle-vortex composite leads in general to composites with anyonic statistics.