Ergodicity, numerical range, and fixed points of holomorphic mappings

被引：0

作者：

Simeon Reich

David Shoikhet

Jaroslav Zemánek

机构：

[1] The Technion — Israel Institute of Technology,Department of Mathematics

[2] Ort Braude College,Department of Mathematics

[3] Polish Academy of Sciences,Institute of Mathematics

来源：

Journal d'Analyse Mathématique | 2013年 / 119卷

关键词：

Holomorphic Mapping; Nonexpansive Mapping; Numerical Range; Complex Banach Space; Volterra Operator;

D O I：

暂无

中图分类号：

学科分类号：

摘要：

In this paper, we study the local structure of the fixed point set of a holomorphic mapping defined on a (not necessarily bounded or convex) domain in a complex Banach space, using ergodic theory of linear operators and the nonlinear numerical range introduced by L. A. Harris. We provide several constructions of holomorphic retractions and a generalization of Cartan’s Uniqueness Theorem. We also estimate the deviation of a holomorphic mapping from its linear approximation, the Fréchet derivative at a fixed point.

引用

页码：275 / 303

页数：28

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