Browsing by Author "Mustafayev, H."

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A Class of Banach Algebras Whose Duals Have the Schur Property
(1999) Mustafayev, H.; Ülger, A.
Call a commutative Banach algebra A a γ-algebra if it contains a bounded group Λ such that aco(Λ) contains a multiple of the unit ball of A. In this paper, first by exhibiting several concrete examples, we show that the class of γ-algebras is quite rich. Then, for a γ-algebra A, we prove that A* has the Schur property iff the Gelfand spectrum Σ of A is scattered iff A* = ap(A) iff A* = Span(Σ). © TÜBİTAK.
Local Spectral Properties of Generators of C0-Groups and Bernstein Type Inequalities
(Academic Press inc Elsevier Science, 2009) Mustafayev, H.; Temel, C.
Let T = {T(t)}(t epsilon R) be a C-0-group on a complex Banach space X dominated by a weight function omega(t) = (1 + vertical bar t vertical bar)(alpha) (0 <= alpha < 1) and let A be its generator with domain D(A). Among other things, it is shown that if the operator A has compact local spectrum at x is an element of X, then x is an element of D(A) and there exist double sequences of real numbers and (t(n))(n epsilon Z) Such that Ax = Sigma(n is an element of Z) CnT(t(n))x. where Sigma(n is an element of Z) vertical bar C-n vertical bar = r(A)(x); r(A)(X) is the local spectral radius of A at x. As an application, some inequalities of Bernstein type in L-P-spaces are given. (C) 2009 Elsevier Inc. All rights reserved.