A Dynamical Fekete-Szego Theorem
Abstract
Let E⊂C be a compact set symmetric with respect to the real axis. A classical theorem of Fekete-Szego asserts that such a compact set is of logarithmic capacity at least one if and only if it admits approximation by algebraic integers whose Galois conjugates lie arbitrarily close to E. In this note we prove a dynamical analogue of this phenomenon. When cap(E)=1, we also show that the algebraic polynomials arising from the Fekete-Szego theorem generate filled Julia sets KPn which converge to the polynomially convex hull Pc(E) in the Klimek topology, while their Brolin measures converge to the equilibrium measure μE. In particular, when E⊂R, this provides a genuine approximation of E by algebraic filled Julia sets. As an arithmetic application, we prove that the Rumely height associated to E arises as a limit of canonical dynamical heights in the sense of Call and Silverman, giving a dynamical counterpart to the equidistribution theorems of Bilu and Rumely.
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