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عنوان
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INJECTIVITY OF BEURLING AND WEIGHTED MEASURE ALGEBRAS
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نوع پژوهش
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مقاله چاپشده در مجلات علمی
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کلیدواژهها
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Injective module, Beurling algebra, weighted measure algebra, amenable group
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چکیده
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For a locally compact group G let $L^1(G, ω)$ be a Beurling algebra. We characterize injectivity property of $L^1(G, ω), M(G, ω)$ and $L^1(G, ω)$ as a Banach $L^1(G, ω)$-Modules. This characterization is employed to find a necessary and sufficient condition for amenability of G. In the special case where ${ω_n}^∞_n=1$ is a sequence of weight functions on G we prove the same result for Fr´echet algebras $A(ω)$ and $B(ω)$.
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پژوهشگران
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اسمعیل فیضی (نفر اول)، جواد سلیمانی (نفر دوم)
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