Non-harmonic analysis of the wave equation for Schr\"odinger operators with complex potential

Abstract

This article investigates the wave equation for the Schr\"odinger operator on Rn, denoted as H0:=-+V, where is the standard Laplacian and V is a complex-valued multiplication operator. We prove that the operator H0, with Re(V)≥ 0 and Re(V)(x)∞ as |x|∞, has a purely discrete spectrum under certain conditions. In the spirit of Colombini, De Giorgi, and Spagnolo, we also prove that the Cauchy problem with regular coefficients is well-posed in the associated Sobolev spaces, and when the propagation speed is H\"older continuous (or more regular), it is well-posed in Gevrey spaces. Furthermore, we prove that it is very weakly well-posed when the coefficients possess a distributional singularity.