Q-chains in the $U(1)$ gauged Friedberg-Lee-Sirlin model

Viktor Loiko; Ilya Perapechka; Yakov Shnir

arXiv:2012.01052·hep-th·May 26, 2021

Q-chains in the $U(1)$ gauged Friedberg-Lee-Sirlin model

Viktor Loiko, Ilya Perapechka, Yakov Shnir

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TL;DR

This paper constructs and analyzes static axially symmetric multi-Q-ball configurations in a gauged Friedberg-Lee-Sirlin model, revealing their properties and existence domains in flat spacetime.

Contribution

It introduces new multi-Q-ball solutions in a gauged model, expanding understanding of soliton chains in flat spacetime.

Findings

01

Chains of spinning charged Q-balls are electromagnetically bounded.

02

Configurations exist within specific parameter domains.

03

Properties of these multi-Q-ball solutions are characterized.

Abstract

We construct static axially symmetric multi-Q-ball configurations in the $U (1)$ gauged two-component Fridberg-Lee-Sirlin model a flat spacetime. The solutions represent electromagnetically bounded chains of stationary spinning charged Q-balls placed along the axis of symmetry. We discuss the properties of these configurations and exhibit their domain of existence.

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