Nonconcentration of energy for a semilinear Skyrme model

Dan-Andrei Geba; S. G. Rajeev

arXiv:1006.3470·math.AP·November 21, 2014

Nonconcentration of energy for a semilinear Skyrme model

Dan-Andrei Geba, S. G. Rajeev

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TL;DR

This paper proves that in a specific semilinear Skyrme model, the energy of equivariant solutions does not concentrate, advancing understanding of soliton stability in field theories.

Contribution

It demonstrates nonconcentration of energy for equivariant solutions in a semilinear Skyrme model, extending previous work on soliton stability.

Findings

01

Energy does not concentrate for equivariant solutions.

02

Supports stability analysis of chiral solitons.

03

Advances mathematical understanding of Skyrme models.

Abstract

We continue our investigation of a model introduced by Adkins and Nappi, in which omega mesons stabilize chiral solitons. The aim of this article is to show that the energy associated to equivariant solutions does not concentrate.

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