Add to ORKGIn the stability and blowup for traveling or standing waves in nonlinear Hamiltonian dispersive equations, the non-degeneracy of the linearization about such a wave is of paramount importance. That is, one must verify the kernel of the second variation of the Hamiltonian is generated by the continuous symmetries of the PDE. The proof of this property can be far from trivial, especially in cases where the dispersion admits a nonlocal description where shooting arguments, Sturm-Liouville theories, and other ODE methods may not be applicable. In this talk, we discuss the non degeneracy and nonlinear orbital stability of antiperiodic traveling wave solutions to a class of defocusing NLS equations with fractional dispersion. Key to our analy...
A surprisingly large number of physically relevant dispersive partial differential equations are int...
International audienceThe nonlinear Schrödinger equation possesses three distinct six-parameter fami...
In this work, we present analytical studies of standing waves in three NLS models. We first consider...
In the stability and blowup for traveling or standing waves in nonlinear Hamiltonian dispersive equa...
We study the stability and instability of periodic traveling waves for Korteweg--de Vries-type equat...
We consider orbital stability for several dispersive type PDEs including the nonlinear fractional Sc...
In this work consisting of joint projects with my advisor, Dr. Mathew Johnson, we study the existenc...
International audienceThe nonlinear Schrödinger equation has several families of quasi-periodic trav...
International audienceStability criteria have been derived and investigated in the last decades for ...
We analytically and numerically investigate the stability and dynamics of the plane wave solutions o...
The present paper deals with sufficient conditions for orbital stability of periodic waves of a gene...
This article addresses orbital stability of periodic travelling-wave solutions for coupled nonlinea...
In this article we are concerned with the existence and orbital stability of traveling wave solution...
For Hamiltonian systems of PDEs the stability of periodic waves is encoded by the Hessian of an acti...
Abstract. We study the modulational instability of periodic traveling waves for a class of Hamiltoni...
A surprisingly large number of physically relevant dispersive partial differential equations are int...
International audienceThe nonlinear Schrödinger equation possesses three distinct six-parameter fami...
In this work, we present analytical studies of standing waves in three NLS models. We first consider...
In the stability and blowup for traveling or standing waves in nonlinear Hamiltonian dispersive equa...
We study the stability and instability of periodic traveling waves for Korteweg--de Vries-type equat...
We consider orbital stability for several dispersive type PDEs including the nonlinear fractional Sc...
In this work consisting of joint projects with my advisor, Dr. Mathew Johnson, we study the existenc...
International audienceThe nonlinear Schrödinger equation has several families of quasi-periodic trav...
International audienceStability criteria have been derived and investigated in the last decades for ...
We analytically and numerically investigate the stability and dynamics of the plane wave solutions o...
The present paper deals with sufficient conditions for orbital stability of periodic waves of a gene...
This article addresses orbital stability of periodic travelling-wave solutions for coupled nonlinea...
In this article we are concerned with the existence and orbital stability of traveling wave solution...
For Hamiltonian systems of PDEs the stability of periodic waves is encoded by the Hessian of an acti...
Abstract. We study the modulational instability of periodic traveling waves for a class of Hamiltoni...
A surprisingly large number of physically relevant dispersive partial differential equations are int...
International audienceThe nonlinear Schrödinger equation possesses three distinct six-parameter fami...
In this work, we present analytical studies of standing waves in three NLS models. We first consider...