Concentration Behavior of Ground States for L2-Critical Schr\"odinger Equation with a Spatially Decaying Nonlinearity
Abstract
We consider the following time-independent nonlinear L2-critical Schr\"odinger equation \[ - u(x)+V(x)u(x)-a|x|-b|u|1+4-2bN=μ u(x)\,\ in\,\ RN, \] where μ∈R, a>0, N≥ 1, 0<b<\2,N\, and V(x) is an external potential. It is shown that ground states of the above equation can be equivalently described by minimizers of the corresponding minimization problem. In this paper, we prove that there is a threshold a*>0 such that minimizer exists for 0<a<a* and minimizer does not exist for any a>a*. However if a=a*, it is proved that whether minimizer exists depends sensitively on the value of V(0). Moreover, when there is no minimizer at threshold a*, we give a detailed concentration behavior of minimizers as a a*, based on which we finally prove that there is a unique minimizer as a a*.
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