Extension and Integral Representation of the finite Hilbert Transform In Rearrangement Invariant Spaces

Abstract

The finite Hilbert transform T is a classical (singular) kernel operator which is continuous in every rearrangement invariant space X over (-1,1) having non-trivial Boyd indices. For X=Lp, 1<p<∞, this operator has been intensively investigated since the 1940's (also under the guise of the ``airfoil equation''). Recently, the extension and inversion of T X X for more general X has been studied in G. P. Curbera, S. Okada, W. J. Ricker, Inversion and extension of the finite Hilbert transform on (-1,1), Ann. Mat. Pura Appl. 198 (2019), 1835-1860, where it is shown that there exists a larger space [T,X], optimal in a well defined sense, which contains X continuously and such that T can be extended to a continuous linear operator T[T,X] X. The purpose of this paper is to continue this investigation of T via a consideration of the X-valued vector measure mX A T(A) induced by T and its associated integration operator f ∫-11f\,dmX. In particular, we present integral representations of T X X based on the L1-space of mX and other related spaces of integrable functions.