Fixed point theorems for infinite dimensional holomorphic functions

Lawrence A. Harris

doi:10.4134/JKMS.2004.41.1.175

Fixed point theorems for infinite dimensional holomorphic functions

Lawrence A. Harris

Mathematics

Producción científica: Article › revisión exhaustiva

8 Citas (Scopus)

Resumen

This talk discusses conditions on the numerical range of a holomorphic function defined on a bounded convex domain in a complex Banach space that imply that the function has a unique fixed point. In particular, extensions of the Earle-Hamilton Theorem are given for such domains. The theorems are applied to obtain a quantitative version of the inverse function theorem for holomorphic functions and a distortion form of Cartan's uniqueness theorem.

Idioma original	English
Páginas (desde-hasta)	175-192
Número de páginas	18
Publicación	Journal of the Korean Mathematical Society
Volumen	41
N.º	1
DOI	https://doi.org/10.4134/JKMS.2004.41.1.175
Estado	Published - 2004

ASJC Scopus subject areas

General Mathematics

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title = "Fixed point theorems for infinite dimensional holomorphic functions",

abstract = "This talk discusses conditions on the numerical range of a holomorphic function defined on a bounded convex domain in a complex Banach space that imply that the function has a unique fixed point. In particular, extensions of the Earle-Hamilton Theorem are given for such domains. The theorems are applied to obtain a quantitative version of the inverse function theorem for holomorphic functions and a distortion form of Cartan's uniqueness theorem.",

keywords = "Banach space, Bloch radii, Cartan uniqueness theorem, Convex domain, Fr{\'e}chet derivative, Holomorphic numerical range",

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T1 - Fixed point theorems for infinite dimensional holomorphic functions

AU - Harris, Lawrence A.

PY - 2004

Y1 - 2004

N2 - This talk discusses conditions on the numerical range of a holomorphic function defined on a bounded convex domain in a complex Banach space that imply that the function has a unique fixed point. In particular, extensions of the Earle-Hamilton Theorem are given for such domains. The theorems are applied to obtain a quantitative version of the inverse function theorem for holomorphic functions and a distortion form of Cartan's uniqueness theorem.

AB - This talk discusses conditions on the numerical range of a holomorphic function defined on a bounded convex domain in a complex Banach space that imply that the function has a unique fixed point. In particular, extensions of the Earle-Hamilton Theorem are given for such domains. The theorems are applied to obtain a quantitative version of the inverse function theorem for holomorphic functions and a distortion form of Cartan's uniqueness theorem.

KW - Banach space

KW - Bloch radii

KW - Cartan uniqueness theorem

KW - Convex domain

KW - Fréchet derivative

KW - Holomorphic numerical range

UR - https://www.scopus.com/pages/publications/18544372758

UR - https://www.scopus.com/pages/publications/18544372758#tab=citedBy

U2 - 10.4134/JKMS.2004.41.1.175

DO - 10.4134/JKMS.2004.41.1.175

M3 - Article

AN - SCOPUS:18544372758

SN - 0304-9914

VL - 41

SP - 175

EP - 192

JO - Journal of the Korean Mathematical Society

JF - Journal of the Korean Mathematical Society

IS - 1

ER -

Fixed point theorems for infinite dimensional holomorphic functions

Resumen

ASJC Scopus subject areas

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Huella

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