Shrinking Cesáro means method for the split equilibrium and fixed point problems in Hilbert spaces

Samy A. Harisa; M. A.A. Khan; F. Mumtaz; Nashat Faried; Ahmed Morsy; Kottakkaran Sooppy Nisar; Abdul Ghaffar

doi:10.1186/s13662-020-02800-z

Shrinking Cesáro means method for the split equilibrium and fixed point problems in Hilbert spaces

Samy A. Harisa, M. A.A. Khan, F. Mumtaz, Nashat Faried, Ahmed Morsy, Kottakkaran Sooppy Nisar, Abdul Ghaffar

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9 Scopus citations

Abstract

We propose a modified version of the classical Cesáro means method endowed with the hybrid shrinking projection method to solve the split equilibrium and fixed point problems (SEFPP) in Hilbert spaces. One of the main reasons to equip the classical Cesáro means method with the shrinking projection method is to establish strong convergence results which are often required in infinite-dimensional functional spaces. As a consequence, the convergence analysis is carried out under mild conditions on the underlying shrinking Cesáro means method. We emphasize that the results accounted in this manuscript can be considered as an improvement and generalization of various existing exciting results in this field of study.

Original language	English
Article number	345
Journal	Advances in Difference Equations
Volume	2020
Issue number	1
DOIs	https://doi.org/10.1186/s13662-020-02800-z
State	Published - 1 Dec 2020

Keywords

Cesáro means method
Shrinking projection method
Split equilibrium fixed point problem
Total asymptotically nonexpansive mapping

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10.1186/s13662-020-02800-z

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title = "Shrinking Ces{\'a}ro means method for the split equilibrium and fixed point problems in Hilbert spaces",

abstract = "We propose a modified version of the classical Ces{\'a}ro means method endowed with the hybrid shrinking projection method to solve the split equilibrium and fixed point problems (SEFPP) in Hilbert spaces. One of the main reasons to equip the classical Ces{\'a}ro means method with the shrinking projection method is to establish strong convergence results which are often required in infinite-dimensional functional spaces. As a consequence, the convergence analysis is carried out under mild conditions on the underlying shrinking Ces{\'a}ro means method. We emphasize that the results accounted in this manuscript can be considered as an improvement and generalization of various existing exciting results in this field of study.",

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T1 - Shrinking Cesáro means method for the split equilibrium and fixed point problems in Hilbert spaces

AU - Harisa, Samy A.

AU - Khan, M. A.A.

AU - Mumtaz, F.

AU - Faried, Nashat

AU - Morsy, Ahmed

AU - Nisar, Kottakkaran Sooppy

AU - Ghaffar, Abdul

PY - 2020/12/1

Y1 - 2020/12/1

N2 - We propose a modified version of the classical Cesáro means method endowed with the hybrid shrinking projection method to solve the split equilibrium and fixed point problems (SEFPP) in Hilbert spaces. One of the main reasons to equip the classical Cesáro means method with the shrinking projection method is to establish strong convergence results which are often required in infinite-dimensional functional spaces. As a consequence, the convergence analysis is carried out under mild conditions on the underlying shrinking Cesáro means method. We emphasize that the results accounted in this manuscript can be considered as an improvement and generalization of various existing exciting results in this field of study.

AB - We propose a modified version of the classical Cesáro means method endowed with the hybrid shrinking projection method to solve the split equilibrium and fixed point problems (SEFPP) in Hilbert spaces. One of the main reasons to equip the classical Cesáro means method with the shrinking projection method is to establish strong convergence results which are often required in infinite-dimensional functional spaces. As a consequence, the convergence analysis is carried out under mild conditions on the underlying shrinking Cesáro means method. We emphasize that the results accounted in this manuscript can be considered as an improvement and generalization of various existing exciting results in this field of study.

KW - Cesáro means method

KW - Shrinking projection method

KW - Split equilibrium fixed point problem

KW - Total asymptotically nonexpansive mapping

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DO - 10.1186/s13662-020-02800-z

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AN - SCOPUS:85087864206

SN - 1687-1839

VL - 2020

JO - Advances in Difference Equations

JF - Advances in Difference Equations

IS - 1

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ER -

Shrinking Cesáro means method for the split equilibrium and fixed point problems in Hilbert spaces

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Keywords

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