Sums of CR and projective dual CR functions

A smooth, strongly $\mathbb{C}$-convex, real hypersurface $S$ in $\mathbb{CP}^n$ admits a projective dual CR structure in addition to the standard CR structure. Given a smooth function $u$ on $S$, we provide characterizations for when u can be decomposed as a sum of a CR function and a dual CR function. Following work of Lee on pluriharmonic boundary values, we provide a characterization using differential forms. We further provide a characterization using tangential vector fields in the style of Audibert and Bedford.

2010 Mathematics Subject Classification

32V10

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The first author was supported in part by NSF grant number DMS-1500142.

Received 15 March 2021

Received revised 5 August 2021

Accepted 13 August 2021

Published 13 May 2022