Scattering the geometry of weighted graphs
Abstract
Given two weighted graphs (X,bk,mk), k=1,2 with b1 b2 and m1 m2, we prove a weighted L1-criterion for the existence and completeness of the wave operators W(H2,H1, I1,2), where Hk denotes the natural Laplacian in 2(X,mk) w.r.t. (X,bk,mk) and I1,2 the trivial identification of 2(X,m1) with 2(X,m2). In particular, this entails a very general criterion for the absolutely continuous spectra of H1 and H2 to be equal.
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