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Semidirect Product Compactifications

Published online by Cambridge University Press:  20 November 2018

F. Dangello  and
R. Lindahl
F. Dangello
Affiliation:
Shippensburg State College, Shippensburg, Pennsylvania
R. Lindahl
Affiliation:
Morehead State University, Morehead, Kentucky
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1. Introduction. K. Deleeuw and I. Glicksberg [4] proved that if S and T are commutative topological semigroups with identity, then the Bochner almost periodic compactification of S × T is the direct product of the Bochner almost periodic compactifications of S and T. In Section 3 we consider the semidirect product of two semi topological semigroups with identity and two unital C*-subalgebras and of W(S) and W(T) respectively, where W(S) is the weakly almost periodic functions on S. We obtain necessary and sufficient conditions and for a semidirect product compactification of to exist such that this compactification is a semi topological semigroup and such that this compactification is a topological semigroup. Moreover, we obtain the largest such compactifications.

Type
Research Article
Information
Canadian Journal of Mathematics , Volume 35 , Issue 1 , 01 February 1983 , pp. 1 - 32
Copyright
Copyright © Canadian Mathematical Society 1983

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