Non-local symmetries of the Hirota-Satsuma coupled KdV system and their applications

TL;DR

This paper derives and localizes nonlocal symmetries of the Hirota-Satsuma coupled KdV system from Darboux transformations, leading to new exact solutions and integrable models in various dimensions.

Contribution

It introduces a method to localize nonlocal symmetries from Darboux transformations and constructs new solutions and models for the HS-cKdV system.

Findings

Derived nonlocal symmetries from Darboux transformations.

Localized symmetries enable construction of exact solutions.

Obtained new interaction solutions among solitons, cnoidal, and Painlevé waves.

Abstract

The nonlocal symmetry is derived from the known Darboux transformation (DT) of the Hirota-Satsuma coupled KdV (HS-cKdV) system, and infinitely many nonlocal symmetries are obtained by introducing some internal parameters. By extending the HS-cKdV system to an auxiliary system with five dependent variables, the prolongation is found to localize the nonlocal symmetry related to the DT. Base on the enlarged system, the finite symmetry transformations and similarity reductions about the local symmetries are computed, which lead to some novel exact solutions of the HS-cKdV system. These solutions contain some new solutions from old ones by the finite symmetry transformation and exact interaction solutions among solitons and other complicated waves including periodic cnoidal waves and Painlev\'{e} waves through similarity reductions. Some integrable models from the nonlocal symmetry related to the DT are obtained in two aspects: the negative HS-cKdV hierarchy obtained by introducing the internal parameter and integrable models both in lower and higher dimensions given by restricting the symmetry constraints.