Capacity convergence results and applications to a Berstein-Markov inequality期刊界 All Journals 搜尽天下杂志传播学术成果专业期刊搜索期刊信息化学术搜索

Capacity convergence results and applications to a Berstein-Markov inequality

Authors:	T. Bloom N. Levenberg

Affiliation:	Department of Mathematics, University of Toronto, Toronto, Ontario M5S 3G3, Canada ; Department of Mathematics, University of Auckland, Private Bag 92019, Auckland, New Zealand

Abstract:	Given a sequence ${E_{j}}$ of Borel subsets of a given non-pluripolar Borel set in the unit ball in $mathbf{C}^{N}$ with , we show that the relative capacities $C(E_{j})$ converge to if and only if the relative (global) extremal functions $u_{E_{j}}^{}$ ( $V_{E_{j}}^{}$ ) converge pointwise to $u_{E}^{}$ ( $V_{E}^{}$ ). This is used to prove a sufficient mass-density condition on a finite positive Borel measure with compact support in $mathbf{C}^{N}$ guaranteeing that the pair satisfy a Bernstein-Markov inequality. This implies that the $L^{2}-$ orthonormal polynomials associated to may be used to recover the global extremal function $V_{K}^{*}$ .

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