Improved time-decay for a class of scaling critical electromagnetic Schr\"odinger flows

Abstract

We consider a Schr\"odinger hamiltonian H(A,a) with scaling critical and time independent external electromagnetic potential, and assume that the angular operator L associated to H is positive definite. We prove the following: if \|e-itH(A,a)\|L1 L∞ t-n/2, then \||x|-g(n)e-itH(A,a)|x|-g(n)\|L1 L∞ t-n/2-g(n), g(n) being a positive number, explicitly depending on the ground level of L and the space dimension n. We prove similar results also for the heat semi-group generated by H(A,a).