Symmetry multi-reduction method for partial differential equations with conservation laws

TL;DR

This paper introduces an advanced symmetry-based reduction method for PDEs with multiple variables, enabling direct computation of conservation laws and first integrals, thus simplifying the process of solving symmetry-invariant solutions.

Contribution

The paper generalizes the double reduction method by providing an explicit algorithm for finding all symmetry-invariant conservation laws using multipliers, reducing computational complexity.

Findings

Method yields explicit first integrals for various PDEs.

Allows direct computation of symmetry-invariant conservation laws.

Provides explicit solutions for certain nonlinear PDEs.

Abstract

For partial differential equations (PDEs) that have $n\geq2$ independent variables and a symmetry algebra of dimension at least $n-1$, an explicit algorithmic method is presented for finding all symmetry-invariant conservation laws that will reduce to first integrals for the ordinary differential equation (ODE) describing symmetry-invariant solutions of the PDE. This significantly generalizes the double reduction method known in the literature. Moreover, the condition of symmetry-invariance of a conservation law is formulated in an improved way by using multipliers, thereby allowing symmetry-invariant conservation laws to be obtained directly, without the need to first find conservation laws and then check their invariance. This cuts down considerably the number and complexity of computational steps involved in the reduction method. If the space of symmetry-invariant conservation laws has dimension $m\geq 1$, then the method yields $m$ first integrals along with a check of which ones are non-trivial via their multipliers. Several examples of interesting symmetry reductions are considered: travelling waves and similarity solutions in $1+1$ dimensions; line travelling waves, line similarity solutions, and similarity travelling waves in $2+1$ dimensions; rotationally symmetric similarity solutions in $n+1$ dimensions. In addition, examples of nonlinear PDEs for which the method yields the explicit general solution for symmetry-invariant solutions are shown.