The Cauchy Singular Integral Operator on Weighted Variable Lebesgue Spaces
Abstract
Let p:(1,∞) be a globally log-H\"older continuous variable exponent and w:[0,∞] be a weight. We prove that the Cauchy singular integral operator S is bounded on the weighted variable Lebesgue space Lp(·)(,w)=\f:fw∈ Lp(·)()\ if and only if the weight w satisfies \[ -∞<a<b<∞ 1b-a\|w(a,b)\|p(·)\|w-1(a,b)\|p'(·)<∞ (1/p(x)+1/p'(x)=1). \]
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