On the Hamiltonian-Krein index for a non-self-adjoint spectral problem

Abstract

We investigate the instability index of the spectral problem -c2y'' + b2y + V(x)y = -i z y' on the line R, where V∈ L1 loc(R) is real valued and b,c>0 are constants. This problem arises in the study of stability of solitons for certain nonlinear equations (e.g., the short pulse equation and the generalized Bullough-Dodd equation). We show how to apply the standard approach in the situation under consideration and as a result we provide a formula for the instability index in terms of certain spectral characteristics of the 1-D Schr\"odinger operator HV=-c2d2dx2+b2 +V(x).