The point scatterer approximation for wave dynamics

Abstract

Given an open, bounded and connected set ⊂R3 and its rescaling of size 1, we consider the solutions of the Cauchy problem for the inhomogeneous wave equation (-2_+R3)∂ttu= u+f with initial data and source supported outside ; here, S denotes the characteristic function of a set S. We provide the first-order -corrections with respect to the solutions of the inhomogeneous free wave equation and give space-time estimates on the remainders in the L∞((0,1/τ),L2(R3)) -norm. Such corrections are explicitly expressed in terms of the eigenvalues and eigenfunctions of the Newton potential operator in L2() and provide an effective dynamics describing a legitimate point scatterer approximation in the time domain.