Multi-time Lagrangian 1-forms for families of B\"acklund transformations. Relativistic Toda-type systems

TL;DR

This paper develops a pluri-Lagrangian framework for B"acklund transformations in relativistic Toda systems, embedding them into 2D lattice systems to analyze their integrability, superposition, and conservation laws.

Contribution

It introduces a novel 2D embedding of discrete systems, linking B"acklund transformations with pluri-Lagrangian structures and spectrality properties.

Findings

Established pluri-Lagrangian structure for B"acklund transformations.

Identified corner equations with superposition formulae.

Discovered a 2D spectrality property leading to conservation laws.

Abstract

We establish the pluri-Lagrangian structure for families of B\"acklund transformations of relativistic Toda-type systems. The key idea is a novel embedding of these discrete-time (one-dimensional) systems into certain two-dimensional pluri-Lagrangian lattice systems. This embedding allows us to identify the corner equations (which are the main building blocks of the multi-time Euler-Lagrange equations) with local superposition formulae for B\"acklund transformations. These superposition formulae, in turn, are key ingredients necessary to understand and to prove commutativity of the multi-valued B\"acklund transformations. Furthermore, we discover a two-dimensional generalization of the spectrality property known for families of B\"acklund transformations. This result produces a family of local conservations laws for two-dimensional pluri-Lagrangian lattice systems, with densities being derivatives of the discrete 2-form with respect to the B\"acklund (spectral) parameter. Thus, a relation of the pluri-Lagrangian structure with more traditional integrability notions is established.