Time decay estimates for the wave equation with potential in dimension two

Abstract

We study the wave equation with potential utt- u+Vu=0 in two spatial dimensions, with V a real-valued, decaying potential. With H=-+V, we study a variety of mapping estimates of the solution operators, (tH) and (tH)H under the assumption that zero is a regular point of the spectrum of H. We prove a dispersive estimate with a time decay rate of |t|-12, a polynomially weighted dispersive estimate which attains a faster decay rate of |t|-1( |t|)-2 for |t|>2. Finally, we prove dispersive estimates if zero is not a regular point of the spectrum of H.