$L^p$-Spaces as Quasi *-Algebras

Details $L^p$-Spaces as Quasi *-Algebras $L^p$-Spaces as Quasi *-Algebras

1994-10-05

arxiv.org/abs/funct-an/9410002v1

Mathematics

Operator Algebras

14 pages, AmsLatex

Scientific paper

The Banach space $L^p(X,\mu)$, for $X$ a compact Hausdorff measure space, is
considered as a special kind of quasi *-algebra (called CQ*-algebra) over the
C*-algebra $C(X)$ of continuous functions on $X$. It is shown that, for $p \geq
2$, $(L^p(X,\mu), C(X))$ is *-semisimple (in a generalized sense). Some
consequences of this fact are derived.

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