A Radon-Nikodym theorem for completely multi-positive linear maps and applications
Abstract
052<p type="texpara" tag="Body Text" et="abstract" >A completely n -positive linear map from a locally C-algebra A to another locally C-algebra B is an n× n matrix whose elements are continuous linear maps from A to B and which verifies the condition of completely positivity. In this paper we prove a Radon-Nikodym type theorem for strict completely n-positive linear maps which describes the order relation on the set of all strict completely n -positive linear maps from a locally C -algebra A to a C-algebra B, in terms of a self-dual Hilbert C-module structure induced by each strict completely n -positive linear map. As applications of this result we characterize the pure completely n-positive linear maps from A to B and the extreme elements in the set of all identity preserving completely n-positive linear maps from A to B. Also we determine a certain class of extreme elements in the set of all identity preserving completely positive linear maps from A to Mn(B).
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