Sharp subelliptic estimates in the ∂-Neumann problem via an uncertainty principle
Abstract
The problem of giving a (CR-)geometric description of the best possible order of a subelliptic estimate at a boundary point in the ∂-Neumann problem is largely open. In this paper, we introduce a novel technique based on a "∂-uncertainty principle" and, as an application, we determine the sharp order of subellipticity at the origin for a large class of Kohn's special domains in ambient dimension ≤ 5.
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