Limiting Behavior of Constraint Minimizers for Inhomogeneous Fractional Schr\"odinger Equations

Abstract

This paper is devoted to the L2-constraint variational problem equation* We study L2-normalized solutions of the following inhomogeneous fractional Schr\"odinger equation equation* (-)s u(x)+V(x)u(x)-a|x|-b|u|2β2u(x)=μ u(x)\ \ in\ \ N. equation* Here s∈(12,1), N>2s, a>0, 0<b<\N2,1\, β=2s-bN and V(x)≥ 0 is an external potential. We get L2-normalized solutions of the above equation by solving the associated constrained minimization problem. We prove that there exists a critical value a*>0 such that minimizers exist for 0<a<a*, and minimizers do not exist for any a>a*. In the case of a=a*, one can obtain the classification results of the existence and non-existence for constraint minimizers, which are depended strongly on the value of V(0). For V(0)=0, the limiting behavior of nonnegative minimizers is also analyzed when a tend to a* from below.