Normalized solutions to mass supercritical Schr\"odinger equations with radial potentials
Abstract
We study the stationary nonlinear Schr\"odinger equation equation- u+V(x)u+λ u=|u|q-2u, u ∈ H1(RN), N ≥ 2equation where V ∈ L∞(RN) is a radial potential. In the L2-supercritical regime, we show the existence of an explicit μ0 >0 such that, for any μ ∈ (0, μ0), the equation admits two solutions having L2 norm μ. The potential V is not assumed to have a sign, nor a specific behavior at infinity and only a low regularity is required. Our proof relies on the use of Morse type information, on some spectral arguments, and on a blow-up analysis developed in a radial setting.
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