On existence, uniqueness and radiality of normalized solutions to Schr\"odinger-Poisson equations with non-autonomous nonlinearity
Abstract
We investigate the existence, uniqueness, and radial symmetry of normalized solutions to the Schr\"odinger Poisson equation with non-autonomous nonlinearity f(x,u): equation - u+(|x|-1*|u|2)u=f(x,u)+λ u, equation subject to the constraint Sc=\u∈ H1(R3)|∫R3u2=c>0 \. We consider three cases based on the behavior of f(x,u): the L2 supercritical case, the L2 subcritical case with growth speed less than three power times, and the L2 subcritical case with growth speed more than three power times. We establish the existence of solutions using three different methods depending on f(x,u). Furthermore, we demonstrate the uniqueness and radial symmetry of normalized solutions using an implicit function framework when c is small.
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