Dispersive estimates for the Schr\"odinger equation with finite rank perturbations

Abstract

In this paper, we investigate dispersive estimates for the time evolution of Hamiltonians H=-+Σj=1N·\,, j j\,\,\,in\,\,\,Rd,\,\, d 1, where each j satisfies certain smoothness and decay conditions. We show that, under a spectral assumption, there exists a constant C=C(N, d, 1,…, N)>0 such that \|e-itH\|L1-L∞≤ C t-d2, \,\,\,for\,\,\, t>0. As far as we are aware, this seems to provide the first study of L1-L∞ estimates for finite rank perturbations of the Laplacian in any dimension. We first deal with rank one perturbations (N=1). Then we turn to the general case. The new idea in our approach is to establish the Aronszajn-Krein type formula for finite rank perturbations. This allows us to reduce the analysis to the rank one case and solve the problem in a unified manner. Moreover, we show that in some specific situations, the constant C(N, d, 1,…, N) grows polynomially in N. Finally, as an application, we are able to extend the results to N=∞ and deal with some trace class perturbations.