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عنوان
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ON APPROXIMATE LEFT φ-BIPROJECTIVE BANACH 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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Approximate left φ-biprojectivity, left φ-amenability, Segal algebra, semigroup algebra, measure algebra.
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چکیده
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Let A be a Banach algebra. We introduce the notions of approximate left φ-biprojective and approximate left character biprojective Banach algebras, where φ is a non-zero multiplicative linear functional on A. We show that for a SIN group G, the Segal algebra S(G) is approximate left φ1-biprojective if and only if G is amenable, where φ1 is the augmentation character on S(G). Also we show that the measure algebra M(G) is approximate left character biprojective if and only if G is discrete and amenable. For a Clifford semigroup S, we show that l1(S) is approximate left character biprojective if and only if l1(S) is pseudo-amenable. We study the hereditary property of these notions. Finally we give some examples to show the differences of these notions and the classical ones.
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پژوهشگران
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امیر سهامی (نفر اول)، عبدالرسول پورعباس (نفر دوم)
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