Random coincidence points of subcompatible multivalued maps with applications

A. R. Khan; F. Akbar; N. Sultana

Random coincidence points of subcompatible multivalued maps with applications

A. R. Khan, F. Akbar, N. Sultana

Department of Mathematics

Research output: Contribution to journal › Article › peer-review

7 Scopus citations

Abstract

The notion of subcompatible multivalued mapping is introduced. We present some random coincidence point and invariant approximation results for subcompatible random operators. Our work extends most of the important known results in the current literature to a new class of non-commuting multivalued mappings. We also develop random coincidence results for maps satisfying a more general contractive condition introduced by Ćirić, Ume and Jesic [5].

Original language	English
Pages (from-to)	63-71
Number of pages	9
Journal	Carpathian Journal of Mathematics
Volume	24
Issue number	2
State	Published - 2008

Keywords

Common random fixed point
Opial's condition
Random coincidence point
Semiconvex map
Subcompatible maps

ASJC Scopus subject areas

General Mathematics

Cite this

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title = "Random coincidence points of subcompatible multivalued maps with applications",

abstract = "The notion of subcompatible multivalued mapping is introduced. We present some random coincidence point and invariant approximation results for subcompatible random operators. Our work extends most of the important known results in the current literature to a new class of non-commuting multivalued mappings. We also develop random coincidence results for maps satisfying a more general contractive condition introduced by {\'C}iri{\'c}, Ume and Jesic [5].",

keywords = "Common random fixed point, Opial's condition, Random coincidence point, Semiconvex map, Subcompatible maps",

author = "Khan, \{A. R.\} and F. Akbar and N. Sultana",

year = "2008",

language = "English",

volume = "24",

pages = "63--71",

journal = "Carpathian Journal of Mathematics",

issn = "1584-2851",

number = "2",

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TY - JOUR

T1 - Random coincidence points of subcompatible multivalued maps with applications

AU - Khan, A. R.

AU - Akbar, F.

AU - Sultana, N.

PY - 2008

Y1 - 2008

N2 - The notion of subcompatible multivalued mapping is introduced. We present some random coincidence point and invariant approximation results for subcompatible random operators. Our work extends most of the important known results in the current literature to a new class of non-commuting multivalued mappings. We also develop random coincidence results for maps satisfying a more general contractive condition introduced by Ćirić, Ume and Jesic [5].

AB - The notion of subcompatible multivalued mapping is introduced. We present some random coincidence point and invariant approximation results for subcompatible random operators. Our work extends most of the important known results in the current literature to a new class of non-commuting multivalued mappings. We also develop random coincidence results for maps satisfying a more general contractive condition introduced by Ćirić, Ume and Jesic [5].

KW - Common random fixed point

KW - Opial's condition

KW - Random coincidence point

KW - Semiconvex map

KW - Subcompatible maps

UR - https://www.scopus.com/pages/publications/68349113519

M3 - Article

AN - SCOPUS:68349113519

SN - 1584-2851

VL - 24

SP - 63

EP - 71

JO - Carpathian Journal of Mathematics

JF - Carpathian Journal of Mathematics

IS - 2

ER -

Random coincidence points of subcompatible multivalued maps with applications

Abstract

Keywords

ASJC Scopus subject areas

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