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Completely positive module maps and completely positive extreme maps |
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| Authors: | Sze-kai Tsui |
| Affiliation: | Department of Mathematical Sciences, Oakland University, Rochester, Michigan 48309-4401 |
| Abstract: | Let  be unital  -algebras and  be the set of all completely positive linear maps of  into  . In this article we characterize the extreme elements in  ,  for all  , and pure elements in  in terms of a self-dual Hilbert module structure induced by each  in  . Let  be the subset of  consisting of  -module maps for a von Neumann algebra  . We characterize normal elements in  to be extreme. Results here generalize various earlier results by Choi, Paschke and Lin. |
| Keywords: | Pure completely positive linear maps extreme completely linear maps module maps strongly independent Hilbert module representations |
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