2 research outputs found
Construction and separability of nonlinear soliton integrable couplings
A very natural construction of integrable extensions of soliton systems is
presented. The extension is made on the level of evolution equations by a
modification of the algebra of dynamical fields. The paper is motivated by
recent works of Wen-Xiu Ma et al. (Comp. Math. Appl. 60 (2010) 2601, Appl.
Math. Comp. 217 (2011) 7238), where new class of soliton systems, being
nonlinear integrable couplings, was introduced. The general form of solutions
of the considered class of coupled systems is described. Moreover, the
decoupling procedure is derived, which is also applicable to several other
coupling systems from the literature.Comment: letter, 10 page
Completion of the Ablowitz-Kaup-Newell-Segur integrable coupling
Integrable couplings are associated with non-semisimple Lie algebras. In this
paper, we propose a new method to generate new integrable systems through
making perturbation in matrix spectral problems for integrable couplings, which
is called the `completion process of integrable couplings'. As an example, the
idea of construction is applied to the Ablowitz-Kaup-Newell-Segur integrable
coupling. Each equation in the resulting hierarchy has a bi-Hamiltonian
structure furnished by the component-trace identity