On uniqueness and radiality of minimizers to L2 supercritical Schr\"odinger Poisson equations with general nonlinearities
Abstract
We study the uniqueness and the radial symmetry of minimizers on a Pohozaev-Nehari manifold to the Schr\"odinger Poisson equation with a general nonlinearity f(u). Particularly, we allow that f is L2 supercritical. The main result shows that minimizers are unique and radially symmetric modulo suitable translations.
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