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EXTREMAL MATRIX STATES ON OPERATOR SYSTEMS

Published online by Cambridge University Press:  01 June 2000

DOUGLAS R. FARENICK
Affiliation:
Department of Mathematics and Statistics, University of Regina, Regina, Saskatchewan S4S 0A2, Canada
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Abstract

A classical result of Kadison concerning the extension, via the Hahn–Banach theorem, of extremal states on unital self-adjoint linear manifolds (that is, operator systems) in C*-algebras is generalised to the setting of noncommutative convexity, where one has matrix states (that is, unital completely positive linear maps) and matrix convexity. It is shown that if ϕ is a matrix extreme point of the matrix state space of an operator system R in a unital C*-algebra A, then ϕ has a completely positive extension to a matrix extreme point Φ of the matrix state space of A. This result leads to a characterisation of extremal matrix states as pure completely positive maps and to a new proof of a decomposition of C*-extreme points.

Type
Research Article
Copyright
The London Mathematical Society 2000

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