Approximation methods with inertial term for large-scale nonlinear monotone equations

A. H. Ibrahim; P. Kumam; S. Rapajić; Z. Papp; A. B. Abubakar

doi:10.1016/j.apnum.2022.06.015

Approximation methods with inertial term for large-scale nonlinear monotone equations

A. H. Ibrahim, P. Kumam^*, S. Rapajić, Z. Papp, A. B. Abubakar

^*Corresponding author for this work

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

25 Scopus citations

Abstract

In recent years, systems of nonlinear equations have attracted widespread attention and have been extensively studied. The recent designed Fletcher-Reeves (FR) type methods of Papp and Rapajić [Appl. Math. Comput. 269 (2015) 816–823] [27] are efficient in solving large-scale monotone nonlinear equations due to the simple iterative form. In this paper, we propose an accelerated variant of these FR-type methods for approximating the solutions of nonlinear equations involving monotone and Lipschitz continuous mappings. Under suitable assumptions, we prove that the sequence generated by the new algorithm converges globally. Some numerical results are reported to illustrate the computational performance of the new methods.

Original language	English
Pages (from-to)	417-435
Number of pages	19
Journal	Applied Numerical Mathematics
Volume	181
DOIs	https://doi.org/10.1016/j.apnum.2022.06.015
State	Published - Nov 2022
Externally published	Yes

Bibliographical note

Publisher Copyright:
© 2022 IMACS

Keywords

Derivative-free method
Inertial effect
Iterative method
Nonlinear equations
Projection method

ASJC Scopus subject areas

Numerical Analysis
Computational Mathematics
Applied Mathematics

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10.1016/j.apnum.2022.06.015

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@article{686b347fbe704e34af597931ad9cac6f,

title = "Approximation methods with inertial term for large-scale nonlinear monotone equations",

abstract = "In recent years, systems of nonlinear equations have attracted widespread attention and have been extensively studied. The recent designed Fletcher-Reeves (FR) type methods of Papp and Rapaji{\'c} [Appl. Math. Comput. 269 (2015) 816–823] [27] are efficient in solving large-scale monotone nonlinear equations due to the simple iterative form. In this paper, we propose an accelerated variant of these FR-type methods for approximating the solutions of nonlinear equations involving monotone and Lipschitz continuous mappings. Under suitable assumptions, we prove that the sequence generated by the new algorithm converges globally. Some numerical results are reported to illustrate the computational performance of the new methods.",

keywords = "Derivative-free method, Inertial effect, Iterative method, Nonlinear equations, Projection method",

author = "Ibrahim, \{A. H.\} and P. Kumam and S. Rapaji{\'c} and Z. Papp and Abubakar, \{A. B.\}",

note = "Publisher Copyright: {\textcopyright} 2022 IMACS",

year = "2022",

month = nov,

doi = "10.1016/j.apnum.2022.06.015",

language = "English",

volume = "181",

pages = "417--435",

journal = "Applied Numerical Mathematics",

issn = "0168-9274",

publisher = "Elsevier B.V.",

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TY - JOUR

T1 - Approximation methods with inertial term for large-scale nonlinear monotone equations

AU - Ibrahim, A. H.

AU - Kumam, P.

AU - Rapajić, S.

AU - Papp, Z.

AU - Abubakar, A. B.

PY - 2022/11

Y1 - 2022/11

N2 - In recent years, systems of nonlinear equations have attracted widespread attention and have been extensively studied. The recent designed Fletcher-Reeves (FR) type methods of Papp and Rapajić [Appl. Math. Comput. 269 (2015) 816–823] [27] are efficient in solving large-scale monotone nonlinear equations due to the simple iterative form. In this paper, we propose an accelerated variant of these FR-type methods for approximating the solutions of nonlinear equations involving monotone and Lipschitz continuous mappings. Under suitable assumptions, we prove that the sequence generated by the new algorithm converges globally. Some numerical results are reported to illustrate the computational performance of the new methods.

AB - In recent years, systems of nonlinear equations have attracted widespread attention and have been extensively studied. The recent designed Fletcher-Reeves (FR) type methods of Papp and Rapajić [Appl. Math. Comput. 269 (2015) 816–823] [27] are efficient in solving large-scale monotone nonlinear equations due to the simple iterative form. In this paper, we propose an accelerated variant of these FR-type methods for approximating the solutions of nonlinear equations involving monotone and Lipschitz continuous mappings. Under suitable assumptions, we prove that the sequence generated by the new algorithm converges globally. Some numerical results are reported to illustrate the computational performance of the new methods.

KW - Derivative-free method

KW - Inertial effect

KW - Iterative method

KW - Nonlinear equations

KW - Projection method

UR - https://www.scopus.com/pages/publications/85134191243

U2 - 10.1016/j.apnum.2022.06.015

DO - 10.1016/j.apnum.2022.06.015

M3 - Article

AN - SCOPUS:85134191243

SN - 0168-9274

VL - 181

SP - 417

EP - 435

JO - Applied Numerical Mathematics

JF - Applied Numerical Mathematics

ER -

Approximation methods with inertial term for large-scale nonlinear monotone equations

Abstract

Bibliographical note

Keywords

ASJC Scopus subject areas

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