On uniqueness of multi-bubble blow-up solutions and multi-solitons to L2-critical nonlinear Schr\"odinger equations

Abstract

We are concerned with the focusing L2-critical nonlinear Schr\"odinger equations in Rd for d=1,2. The uniqueness is proved for a large energy class of multi-bubble blow-up solutions, which converge to a sum of K pseudo-conformal blow-up solutions particularly with low rate (T-t)0+, as t T, 1≤ K<∞. Moreover, we also prove the uniqueness in the energy class of multi-solitons which converge to a sum of K solitary waves with convergence rate (1/t)2+, as t ∞. The uniqueness class is further enlarged to contain the multi-solitons with even lower convergence rate (1/t) 12+ in the pseudo-conformal space. The proof is mainly based on the pseudo-conformal invariance and the monotonicity properties of several functionals adapted to the multi-bubble case, the latter is crucial towards the upgradation of the convergence to the fast exponential decay rate.