Normalized solutions for nonlinear Schr\"odinger equations with L2-critical nonlinearity
Abstract
We study the following nonlinear Schr\"odinger equation and we look for normalized solutions (μ,u)∈ R× H1( RN) for a given m>0 and N≥ 2 \[ - u + μ u = g(u) in\ RN, 12∫ RN u2 dx = m. \] We assume that g has an L2-critical growth, both at the origin and at infinity. That is, for p=1+4N, g(s)=|s|p-1s +h(s), h(s)=o(|s|p) as s 0 and s∞. The L2-critical exponent p is very special for this problem; in the power case g(s) = |s|p-1s a solution exists only for the specific mass m=m1, where m1=12∫ RNω12\, dx is the mass of a least energy solution ω1 of - ω+ω=ωp in RN. We prove the existence of a positive solution for m=m1 when h has a sublinear growth at infinity, i.e., h(s)=o(s) as s∞. In contrast, we show non-existence results for h(s)=o(s) (s 0) under a suitable monotonicity condition.
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