Formal Integrals and Noether Operators of Nonlinear Hyperbolic Partial Differential Systems Admitting a Rich Set of Symmetries

TL;DR

This paper investigates nonlinear hyperbolic PDE systems with rich symmetry structures, establishing conditions for the existence of formal integrals and Noether operators, which extend beyond classical Lagrangian frameworks.

Contribution

It demonstrates that systems with a full set of symmetry-mapping operators are characterized by the existence of formal integrals and associated Noether operators, broadening the understanding beyond Lagrangian systems.

Findings

Systems with full symmetry operators admit formal integrals.

Such systems possess both direct and inverse Noether operators.

Inverse Noether operators exist under certain differential substitutions.

Abstract

The paper is devoted to hyperbolic (generally speaking, non-Lagrangian and nonlinear) partial differential systems possessing a full set of differential operators that map any function of one independent variable into a symmetry of the corresponding system. We demonstrate that a system has the above property if and only if this system admits a full set of formal integrals (i.e., differential operators which map symmetries into integrals of the system). As a consequence, such systems possess both direct and inverse Noether operators (in the terminology of a work by B. Fuchssteiner and A.S. Fokas who have used these terms for operators that map cosymmetries into symmetries and perform transformations in the opposite direction). Systems admitting Noether operators are not exhausted by Euler-Lagrange systems and the systems with formal integrals. In particular, a hyperbolic system admits an inverse Noether operator if a differential substitution maps this system into a system possessing an inverse Noether operator.