Regularity in the ∂--Neumann problem, D'Angelo forms, and Diederich--Forn ss index

Abstract

This article chronicles a development that started around 1990 with BoasStraube91, where the authors showed that if a smooth bounded pseudoconvex domain in Cn admits a defining function that is plurisubharmonic at points of the boundary, then the ∂--Neumann operators on preserve the Sobolev spaces Ws(0,q)(), s≥ 0. The same authors then proved a further regularity result and made explicit the role of D'Angelo forms for regularity (BoasStraube93). A few years later, Kohn (Kohn99) initiated a quantitative study of the results in BoasStraube91 by relating the Sobolev level up to which regularity holds to the Diederich--Forn ss index of the domain. Many of these ideas were synthesized and developed further by Harrington (Harrington11,Harrington19,Harrington22). Then, around 2020, Liu (Liu19b, Liu19) and Yum (Yum21) discovered that the DF--index is closely related to certain differential inequalities involving D'Angelo forms. This relationship in turn led to a recent new result which supports the conjecture that DF--index one should imply global regularity in the ∂--Neumann problem (LiuStraube22). Much of the work described above relies heavily on Kohn's groundbreaking contributions to the regularity theory of the ∂--Neumann problem.

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