The $L^p$- regularity problem for the Bergman projection of two-dimensional Rudin ball quotients

Debraj Chakrabarti; Alessandro Monguzzi

arXiv:2601.23074·math.CV·February 2, 2026

The $L^p$- regularity problem for the Bergman projection of two-dimensional Rudin ball quotients

Debraj Chakrabarti, Alessandro Monguzzi

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TL;DR

This paper addresses the $L^p$-regularity problem for the Bergman projection on two-dimensional Rudin ball quotients, providing a solution to a specific regularity issue in complex analysis.

Contribution

It offers a novel solution to the $L^p$-regularity problem for the Bergman projection in the context of two-dimensional Rudin ball quotients.

Findings

01

Solved the $L^p$-regularity problem for the Bergman projection

02

Established regularity results specific to Rudin ball quotients

03

Contributed to the understanding of function theory on complex domains

Abstract

We solve the $L^{p}$ -regularity problem of the Bergman projection of two-dimensional Rudin ball quotients.

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Taxonomy

TopicsHolomorphic and Operator Theory · Geometry and complex manifolds · Algebraic and Geometric Analysis