Non-smoothness of the fundamental solutions for Schr\"odinger equations with super-quadratic and spherically symmetric potential

Abstract

We study non-smoothness of the fundamental solution for the Schr\"odinger equation with a spherically symmetric and super-quadratic potential in the sence that V(x)≥ C|x|2+ at infinity with constants C>0 and >0. More precisely, we show the fundamental solution E(t,x,y) does not belong to C1 as a function of (t,x,y).

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