Energy estimates for the supersymmetric nonlinear sigma model and   applications

Volker Branding

arXiv:1506.06973·math.DG·October 19, 2016

Energy estimates for the supersymmetric nonlinear sigma model and applications

Volker Branding

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TL;DR

This paper derives energy and gradient estimates for critical points of the supersymmetric sigma model, providing foundational tools for analyzing solutions and exploring their properties in mathematical physics.

Contribution

It introduces new energy and gradient estimates specifically for the supersymmetric sigma model's critical points, advancing analytical techniques in this area.

Findings

01

Established gradient bounds for solutions

02

Derived energy estimates applicable to supersymmetric models

03

Discussed applications to mathematical physics

Abstract

We derive gradient and energy estimates for critical points of the full supersymmetric sigma model and discuss several applications.

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