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On Weighted Norm Inequalities for Fractional and Singular Integrals

Published online by Cambridge University Press:  20 November 2018

T. Walsh*
Affiliation:
Princeton University, Princeton, New Jersey
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In a recent paper [12] Muckenhoupt and Wheeden have established necessary and sufficient conditions for the validity of norm inequalities of the form ‖ |x|αqC‖ |x|αƒp, where denotes a Calderón and Zygmund singular integral of ƒ or a fractional integral with variable kernel. The purpose of the present paper is to prove, by somewhat different methods, similar inequalities for more general weight functions.

In what follows, for p ≧ 1, p′ is the exponent conjugate to p, given by l/p + l/p′ = 1. Ω will always denote a locally integrable function on Rn which is homogeneous of degree 0, Ω will denote a measurable function on Rn × Rn such that for each xRn, Ω(x, .) is locally integrable and homogeneous of degree 0.

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1971

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