Counting unstable eigenvalues in Hamiltonian spectral problems via commuting operators
Abstract
We present a general counting result for the unstable eigenvalues of linear operators of the form in which and are skew- and self-adjoint operators, respectively. Assuming that there exists a self-adjoint operator such that the operators and commute, we prove that the number of unstable eigenvalues of is bounded by the number of nonpositive eigenvalues of~. As an application, we discuss the transverse stability of one-dimensional periodic traveling waves in the classical KP-II (Kadomtsev--Petviashvili) equation. We show that these one-dimensional periodic waves are transversely spectrally stable with respect to general two-dimensional bounded perturbations, including periodic and localized perturbations in either the longitudinal or the transverse direction, and that they are transversely linearly stable with respect to doubly periodic perturbations.
Cite
@article{arxiv.1609.05125,
title = {Counting unstable eigenvalues in Hamiltonian spectral problems via commuting operators},
author = {Mariana Haragus and Jin Li and Dmitry E. Pelinovsky},
journal= {arXiv preprint arXiv:1609.05125},
year = {2017}
}
Comments
22 pages