Supersymmetric Reciprocal Transformation and Its Applications

TL;DR

This paper introduces a supersymmetric reciprocal transformation linking specific supersymmetric integrable equations, enabling the construction of recursion operators and bi-Hamiltonian structures, and proposes new supersymmetric equations with their properties.

Contribution

It develops a supersymmetric reciprocal transformation and applies it to establish connections and structures for supersymmetric integrable equations, including new equations.

Findings

Established a supersymmetric reciprocal transformation.

Constructed recursion operators and bi-Hamiltonian structures.

Proposed and analyzed new supersymmetric equations.

Abstract

The supersymmetric analog of the reciprocal transformation is introduced. This is used to establish a transformation between one of the supersymmetric Harry Dym equations and the supersymmetric modified Korteweg-de Vries equation. The reciprocal transformation, as a B\"{a}cklund-type transformation between these two equations, is adopted to construct a recursion operator of the supersymmetric Harry Dym equation. By proper factorization of the recursion operator, a bi-Hamiltonian structure is found for the supersymmetric Harry Dym equation. Furthermore, a supersymmetric Kawamoto equation is proposed and is associated to the supersymmetric Sawada-Kotera equation. The recursion operator and odd bi-Hamiltonian structure of the supersymmetric Kawamoto equation are also constructed.