Multiple standing waves of Helmholtz equation with mixed dispersion concentrating in the high frequency limit

Abstract

In this paper, we study the nonlinear Helmholtz equation with mixed dispersion equation* 2 u-β k2\, u+α k4 u=W(x)\, |u|p-2u~in~RN, equation* where the weight function W(x) is continuous, nonnegative, and satisfies \[ |x|∞ W(x) \;<\; x∈RN W(x). \] Within each of the following parameter ranges, center (a) α<0, β∈R; (b) α>0, β<-2α; (c) α=0, β<0, center After a suitable rescaling, we obtain the existence of dual ground state solutions, which concentrate along the global maximizers of W as k∞. In addition, we establish the existence of multiple solutions associated with the set of global maximum points of W, and we further characterize the precise concentration behavior of these solutions.