Normalized clustering peak solutions for Schr\"odinger equations with general nonlinearities

Abstract

We are concerned with the normalized -peak solutions to the nonlinear Schr\"odinger equation \[ -2 v+V(x)v=f(v)+λ v, ∫RNv2 =α N. \] Here λ ∈ R will arise as a Lagrange multiplier, V has a local maximum point, and f is a general L2-subcritical nonlinearity satisfying a nonlipschitzian property that s0 f(s)/s=-∞. The peaks of solutions that we construct cluster near a local maximum of V as 0. Since there is no information about the uniqueness or nondegeneracy for the limiting system, a delicate lower gradient estimate should be established when the local centers of mass of functions are away from the local maximum of V. We introduce a new method to obtain this estimate, which is significantly different from the ideas in del Pino and Felmer (Math. Ann. 2002), where a special gradient flow with high regularity is used, and in Byeon and Tanaka (J. Eur. Math. Soc. 2013 \& Mem. Amer. Math. Soc. 2014), where an extra translation flow is introduced. We also give the existence of ground state solutions for the autonomous problem, i.e., the case V0. The ground state energy is not always negative and the strict subadditive property of ground state energy here is achieved by strict concavity.