Mass Concentration and Local Uniqueness of Ground States for L2-subcritical Nonlinear Schr\"odinger Equations

Abstract

We consider ground states of L2-subcritical nonlinear Schr\"odinger equation (1.1), which can be described equivalently by minimizers of the following constraint minimization problem e():=∈f\E(u):u∈ H(Rd),\|u\|22=1\. The energy functional E(u) is defined by E(u):=12∫Rd|∇ u|2dx +12∫RdV(x)|u|2dx-p-1p+1∫Rd|u|p+1dx, where d≥1, >0, p∈(1, 1+4d) and 0≤ V(x)∞ as |x| ∞. We present a detailed analysis on the concentration behavior of ground states as ∞, which extends the concentration results shown in [22]. Moreover, the uniqueness of nonnegative ground states is also proved when is large enough.