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@article{faucris.117699384,
abstract = {If *D* is a bounded symmetric domain in a complex Banach space Z, then the identity component G of its group of biholomorphic automorphisms permits a natural embedding into a complex Banach—Lie group H acting partially on Z. A typical model is the action of the group PSL(2,C) by Moebius transformations. In this paper we show that the interior *S* ^{ 0 } of the compression semigroup S := { h ∈ H: h.*D* \subeq *D* } has a polar decomposition in the sense that *S* ^{ 0 } = G \exp(W{\_}G^0), where W{\_}G \subeq ig is a closed convex invariant cone and the polar map G \times W{\_}G^0 → S^0 is a diffeomorphism.},
author = {Neeb, Karl-Hermann},
doi = {10.1007/s002330010037},
faupublication = {no},
journal = {Semigroup Forum},
pages = {71-105},
peerreviewed = {Yes},
title = {{Compressions} of infinite-dimensional bounded symmetric domains},
volume = {63},
year = {2001}
}