Existence of normalized solutions to nonlinear Schr\"odinger equations with potential on lattice graphs

Abstract

We study the existence of ground state normalized solution of the following Schr\"odinger equation: equation* cases - u+V(x)u+λ u=f(x,u), & x∈Zd \\ u22=a cases equation* where V(x) is trapping potential or well potential, f(x,u) satisfies Berestycki-Lions type condition and other suitable conditions. We show that there always exists a threshold α∈[0,∞) such that there do not exist ground state normalized solutions for a∈ (0,α), and there exists a ground state normalized solution for a∈(α,∞). Furthermore, we prove sufficient conditions for the positivity of α that α=0 if f(x,u) is mass-subcritical near 0, and α>0 if f(x,u) is mass-critical or mass-supercritical near 0.