The relationship between the conservation laws and multi‐Hamiltonian structures of the Kundu equation

Abstract: By the Lagrangian multiplier and constraint variational derivative, a relationship between conserved quantities and multi-Hamiltonian structures is built. Using the relation, a method is founded to prove the infinitedimensional Liouville integrability of evolution equations with continuous variables. As the application, the conservation laws of the Kundu equation are first obtained. Its conserved quantities are deduced for comparing by Fokas' method different from the method used in the existed literature. The… Show more

Conservation laws analysis of nonlinear partial differential equations and their linear soliton solutions and Hamiltonian structures

Conservation laws analysis of nonlinear partial differential equations and their linear soliton solutions and Hamiltonian structures