Minimizers of L2-critical inhomogeneous variational problems with a spatially decaying nonlinearity in bounded domains

Abstract

We consider the minimizers of L2-critical inhomogeneous variational problems with a spatially decaying nonlinear term in an open bounded domain of RN which contains 0. We prove that there is a threshold a*>0 such that minimizers exist for 0<a<a* and the minimizer does not exist for any a>a*. In contrast to the homogeneous case, we show that both the existence and nonexistence of minimizers may occur at the threshold a* depending on the value of V(0), where V(x) denotes the trapping potential. Moreover, under some suitable assumptions on V(x), based on a detailed analysis on the concentration behavior of minimizers as a a*, we prove local uniqueness of minimizers when a is close enough to a*.

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