Existence of traveling waves for a fourth order Schr\" odinger equation with mixed dispersion in the Helmholtz regime

Abstract

In this paper, we study the existence of traveling waves for a fourth order Schr\" odinger equations with mixed dispersion, that is, solutions to 2 u +β u +i V ∇ u +α u =|u|p-2 u,\ in\ N ,\ N≥ 2. We consider this equation in the Helmholtz regime, when the Fourier symbol P of our operator is strictly negative at some point. Under suitable assumptions, we prove the existence of solution using the dual method of Evequoz and Weth provided that p∈ (p1 , 2N/(N-4)+). The real number p1 depends on the number of principal curvature of M staying bounded away from 0, where M is the hypersurface defined by the roots of P. We also obtained estimates on the Green function of our operator and a Lp - Lq resolvent estimate which can be of independent interest and can be applied to other operators.