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An atomic representation for Hardy classes of solutions to nonhomogeneous Cauchy-Riemann equations

Published 30 Jun 2023 in math.CV | (2307.00140v1)

Abstract: We develop a representation of the second kind for certain Hardy classes of solutions to nonhomogeneous Cauchy-Riemann equations and use it to show that boundary values in the sense of distributions of these functions can be represented as the sum of an atomic decomposition and an error term. We use the representation to show continuity of the Hilbert transform on this class of distributions and use it to show that solutions to a Schwarz-type boundary value problem can be constructed in the associated Hardy classes.

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