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

Abstract

In this paper, using a discrete Schwarz rearrangement on lattice graphs developed in DSR, we study the existence of global minimizers for the following functional I:H1(ZN) , I(u)=12 ∫ZN|∇ u|2 \,dμ-∫ZN F(u)\, dμ, constrained on Sm:=\u ∈ H1(ZN) \|u\|2(ZN)2=m\, where N ≥ 2, m>0 is prescribed, f ∈ C(R, R) satisfying some technical assumptions and F(t):=∫0t f(τ) \,dτ. We prove the following minimization problem ∈fu ∈ Sm I(u) has an excitation threshold m*∈ [0,+∞] such that equation* ∈fu ∈ Sm I(u)<0 if and only if m>m*. equation* Based primarily on m* ∈ (0,+∞) or m*=0, we classify the problem into three different cases: L2-subcritical, L2-critical and L2-supercritical. Moreover, for all three cases, under assumptions that we believe to be nearly optimal, we show that m* also separates the existence and nonexistence of global minimizers for I(u) constrained on Sm.