Multipliers of weighted semigroups and associated Beurling Banach algebras |
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Authors: | S J BHATT P A DABHI H V DEDANIA |
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Institution: | 1.Department of Mathematics,Sardar Patel University,Vallabh Vidyanagar,India |
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Abstract: | Given a weighted discrete abelian semigroup (S, ω), the semigroup M
ω
(S) of ω-bounded multipliers as well as the Rees quotient M
ω
(S)/S together with their respective weights (w)\tilde]\tilde{\omega} and (w)\tilde]q\tilde{\omega}_q induced by ω are studied; for a large class of weights ω, the quotient l1(Mw(S),(w)\tilde])/l1(S,w)\ell^1(M_{\omega}(S),\tilde{\omega})/\ell^1(S,{\omega}) is realized as a Beurling algebra on the quotient semigroup M
ω
(S)/S; the Gel’fand spaces of these algebras are determined; and Banach algebra properties like semisimplicity, uniqueness of uniform
norm and regularity of associated Beurling algebras on these semigroups are investigated. The involutive analogues of these
are also considered. The results are exhibited in the context of several examples. |
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Keywords: | |
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