The Semiadditivity of Continuous Analytic Capacity and the Inner Boundary Conjecture

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چکیده

Let α(E) be the continuous analytic capacity of a compact set E ⊂ C. In this paper we obtain a characterization of α in terms of curvature of measures with zero linear density, and we deduce that α is countably semiadditive. This result has important consequences for the theory of uniform rational approximation on compact sets. In particular, it implies the so called inner boundary conjecture.

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تاریخ انتشار 2003