Total Dilations
Abstract
(1) Let A be an operator on a space H of even finite dimension. Then for some decomposition H= F F, the compressions of A onto F and F are unitarily equivalent. (2) Let \Aj\j=0n be a family of strictly positive operators on a space H. Then, for some integer k, we can dilate each Aj into a positive operator Bj on k H in such a way that: (i) The operator diagonal of Bj consists of a repetition of Aj. (ii) There exist a positive operator B on k H and an increasing function fj : (0,∞)(0,∞) such that Bj=fj(B).
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