Boundary Disintegration for Weighted Residual Energy Trees

Abstract

We study iterated weighted residual (WR) splittings generated by a positive operator R0∈ B(H)+ and a finite family of contractions C1,…,Cm in B(H). The associated residual update R R1/2(I-C*jCj)R1/2 produces an m-ary energy tree of residuals \ Rw\ and dissipated pieces \ Dw,j\ indexed by finite words. From this tree we construct intrinsic path measures on the path space by biasing transitions either by a fixed quadratic form x x,Dw,jx (defining the measures x) or, in the trace-class setting, by tr(Dw,j) (yielding a reference measure tr). When R0∈ S1(H)+, we show that tr dominates the family \ x\ and identify dx/dtr as a canonical martingale limit of cylinder likelihood ratios. Along tr-almost every branch the residuals decrease to a terminal trace-class random variable R∞, which we interpret as the WR boundary variable. We then disintegrate tr over σ(R∞), obtaining a boundary law μtr=(R∞)\#tr and conditional path measures \ Ttr\ . Finally, we show that each x admits a boundary representation as a mixture of \ Ttr\ with an explicit boundary density hx=dμx/dμtr, thereby organizing the family of intrinsic WR path measures by a single trace-biased boundary disintegration.