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Non Commutative Lp Spaces II

Published online by Cambridge University Press:  20 November 2018

A. Katavolos*
Affiliation:
University of Athens, Panepistimiopolis, Athens, Greece
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Let M be a w*-algebra (Von Neumann algebra), τ a semifinite, faithful, normal trace on M. There exists a w*-dense (i.e., dense in the σ(M, M*)-topology, where M* is the predual of M) *-ideal J of M such that τ is a linear functional on J, and

(where |x| = (x*x)1/2) is a norm on J. The completion of J in this norm is Lp(M, τ) (see [2], [8], [7], and [4]).

If M is abelian, in which case there exists a measure space (X, μ) such that M = L(X, μ), then Lp(X, τ) is isometric, in a natural way, to Lp(X, μ). A natural question to ask is whether this situation persists if M is non-abelian. In a previous paper [5] it was shown that it is not possible to have a linear mapping

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1982

References

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