Asymptotic Equivalence of Identification Operators in Geometric Scattering Theory

Abstract

Given two measures μ1 and μ2 on a measurable space X such that dμ2=1,2 \, dμ1 for some bounded measurable function 1,2:X (0,∞), there exist two natural identification operators J1,2,J1,2:L2(X,μ1) L2(X,μ2), namely the unitary J1,2:=/1,2 and the trivial J1,2:=. Given self-adjoint semibounded operators Hj on L2(X,μj), j=1,2, we prove a natural criterion in a topologic setting for the equality of the two-Hilbert-space wave operators W(H2,H1;J1,2) and W(H2,H1;J1,2), by showing that J1,2-J1,2 are asymptotically H1-equivalent in the sense of Kato. It turns out that this criterion is automatically satisfied in typical situations on Riemannian manifolds and weighted infinite graphs in which one has the existence of completeness W(H2,H1;J1,2) (and thus a-posteriori of W(H2,H1;J1,2)).