Geometric conditions for bounded point evaluations in several complex variables
Abstract
Let U be a bounded domain in Cd and let Lpa(U), 1 ≤ p < ∞, denote the space of functions that are analytic on U and bounded in the Lp norm on U. A point x ∈ U is said to be a bounded point evaluation for Lpa(U) if the linear functional f f(x) is bounded in Lpa(U). In this paper, we provide a purely geometric condition given in terms of the Sobolev q-capacity for a point to be a bounded point evaluation for Lpa(U). This extends results known only for the single variable case to several complex variables.
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