Strong instability of standing waves for nonlinear Schr\"odinger equations with attractive inverse power potential

Abstract

We study the strong instability of standing waves eiω tφω(x) for nonlinear Schr\"odinger equations with an L2-supercritical nonlinearity and an attractive inverse power potential, where ω∈R is a frequency, and φω∈ H1(RN) is a ground state of the corresponding stationary equation. Recently, for nonlinear Schr\"odinger equations with a harmonic potential, Ohta (2018) proved that if ∂λ2Sω(φωλ)|λ=10, then the standing wave is strongly unstable, where Sω is the action, and φωλ(x):=λN/2φω(λ x) is the scaling, which does not change the L2-norm. In this paper, we prove the strong instability under the same assumption as the above-mentioned in inverse power potential case. Our proof is applicable to nonlinear Schr\"odinger equations with other potentials such as an attractive Dirac delta potential.