Convergence of Equilibrium Measures under K-regular Polynomial Sequences and their Derivatives
Abstract
Let K⊂C be non-polar, compact and polynomially convex. We study the limits of equilibrium measures on preimages of compact sets, under K-regular sequences of polynomials, that center on K and under the sequences of derivatives of all orders of such sequences. We show that under mild assumptions such limits always exist and equal the equilibrium measure on K. From this we derive convergence of the equilibrium distributions on the Julia sets of the sequence of polynomials and their derivatives of all orders.
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