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Approximating functions in the power-type weighted variable exponent Sobolev space by the hardy averaging operator
Abstract: We investigate the problem of approximating function f in the power-type weighted variable exponent Sobolev space Wr,p(.) ?(.) (0,1), (r = 1, 2, ...), by the Hardy averaging operator A (f) (x) = 1/x ?x0 f(t)dt. If the function f lies in the power-type weighted variable exponent Sobolev space Wr,p(.) ?(.)(0, 1), it is shown that A||(f)?f|| p(.),?(.)?rp(.) ? C ||f(r) p(.),?(.) , where C is a positive constant. Moreover, we consider the problem of boundedness of Hardy averaging operator A in p…
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