Normalized solutions and stability for biharmonic Schr\"odinger equation with potential on waveguide manifold

Abstract

In this paper, we study the following biharmonic Schr\"odinger equation with potential and mixed nonlinearities equation* \arrayll2 u +V(x,y)u+λ u =μ|u|p-2u+|u|q-2u,\ (x, y) ∈ r × Tn, \\ ∫_r×Tnu2dxdy=,array . equation* where r ⊂ Rd is an open bounded convex domain, r>0 is large and μ∈R. The exponents satisfy 2<p<2+8d+n<q<4*=2(d+n)d+n-4, so that the nonlinearity is a combination of a mass subcritical and a mass supercritical term. Under some assumptions on V(x,y) and μ, we obtain the several existence results on waveguide manifold. Moreover, we also consider the orbital stability of the solution.