Continuation theory for contractions on spaces with two vector-valued metrics

Donal O'Regan; Radu Precup

doi:10.1080/0003681031000063784

Continuation theory for contractions on spaces with two vector-valued metrics

Donal O'Regan, Radu Precup

Mathematics

Babes-Bolyai University

Research output: Contribution to a Journal (Peer & Non Peer) › Article › peer-review

15 Citations (Scopus)

Abstract

We develop a continuation theory for contractive maps on spaces with two vector-valued metrics. Applications are presented for systems of operator equations in Banach spaces and, in particular, for systems of abstract Hammerstein integral equations. The use of vector-valued metrics makes it possible for each equation of a system to have its own Lipschitz property, while the use of two such metrics makes it possible for the Lipschitz condition to be expressed with respect to an incomplete metric.

Original language	English
Pages (from-to)	131-144
Number of pages	14
Journal	Applicable Analysis
Volume	82
Issue number	2
DOIs	https://doi.org/10.1080/0003681031000063784
Publication status	Published - Feb 2003

Keywords

Contraction
Fixed Point
Hammerstein Integral Equations
Operator Equation

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10.1080/0003681031000063784

Cite this

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AB - We develop a continuation theory for contractive maps on spaces with two vector-valued metrics. Applications are presented for systems of operator equations in Banach spaces and, in particular, for systems of abstract Hammerstein integral equations. The use of vector-valued metrics makes it possible for each equation of a system to have its own Lipschitz property, while the use of two such metrics makes it possible for the Lipschitz condition to be expressed with respect to an incomplete metric.

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KW - Hammerstein Integral Equations

KW - Operator Equation

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Continuation theory for contractions on spaces with two vector-valued metrics

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Keywords

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