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A Remark on Extensions of CR Functions from Hyperplanes

Published online by Cambridge University Press:  20 November 2018

Luca Baracco*
Affiliation:
Dipartimento di Matematica, Università di Padova, via Trieste 63, 35121 Padova, Italy e-mail: baracco@math.unipd.it
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Abstract

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In the characterization of the range of the Radon transform, one encounters the problem of the holomorphic extension of functions defined on ${{\mathbb{R}}^{2}}\backslash \,{{\Delta }_{\mathbb{R}}}$ (where ${{\Delta }_{\mathbb{R}}}$ is the diagonal in ${{\mathbb{R}}^{2}}$ ) and which extend as “separately holomorphic” functions of their two arguments. In particular, these functions extend in fact to ${{\mathbb{C}}^{2}}\,\backslash \,{{\Delta }_{\mathbb{C}}}$ where ${{\Delta }_{\mathbb{C}}}$ is the complexification of ${{\Delta }_{\mathbb{R}}}$ . We take this theorem from the integral geometry and put it in the more natural context of the $\text{CR}$ geometry where it accepts an easier proof and amore general statement. In this new setting it becomes a variant of the celebrated “edge of the wedge” theorem of Ajrapetyan and Henkin.

Keywords

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 2008

References

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