Surface Gap Soliton Ground States for the Nonlinear Schr\"{o}dinger Equation

TL;DR

This paper investigates the existence of surface gap soliton ground states at the interface of two periodic media described by a nonlinear Schrödinger equation, providing abstract and practical criteria for their existence.

Contribution

It introduces an abstract criterion for surface gap soliton ground states based on ground state energies and offers practical conditions involving linear Bloch waves, with examples.

Findings

Existence of ground states depends on interface properties.

Criteria reduce to conditions on linear Bloch waves in 1D.

Examples demonstrate interfaces satisfying the criteria.

Abstract

We consider the nonlinear Schr\"{o}dinger equation $(-\Delta +V(x))u = \Gamma(x) |u|^{p-1}u$, $x\in \R^n$ with $V(x) = V_1(x) \chi_{\{x_1>0\}}(x)+V_2(x) \chi_{\{x_1<0\}}(x)$ and $\Gamma(x) = \Gamma_1(x) \chi_{\{x_1>0\}}(x)+\Gamma_2(x) \chi_{\{x_1<0\}}(x)$ and with $V_1, V_2, \Gamma_1, \Gamma_2$ periodic in each coordinate direction. This problem describes the interface of two periodic media, e.g. photonic crystals. We study the existence of ground state $H^1$ solutions (surface gap soliton ground states) for $0<\min \sigma(-\Delta +V)$. Using a concentration compactness argument, we provide an abstract criterion for the existence based on ground state energies of each periodic problem (with $V\equiv V_1, \Gamma\equiv \Gamma_1$ and $V\equiv V_2, \Gamma\equiv \Gamma_2$) as well as a more practical criterion based on ground states themselves. Examples of interfaces satisfying these criteria are provided. In 1D it is shown that, surprisingly, the criteria can be reduced to conditions on the linear Bloch waves of the operators $-\tfrac{d^2}{dx^2} +V_1(x)$ and $-\tfrac{d^2}{dx^2} +V_2(x)$.