N. Choubey, J. P. Jaiswal, “Two- and three-point with memory methods for solving nonlinear equations”, Sib. Zh. Vychisl. Mat., 20:1 (2017), 91–106; Num. Anal. Appl., 10:1 (2017), 74

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Sibirskii Zhurnal Vychislitel'noi Matematiki, 2017, Volume 20, Number 1, Pages 91–106
DOI: https://doi.org/10.15372/SJNM20170109 (Mi sjvm638)

This article is cited in 9 scientific papers (total in 9 papers)

Two- and three-point with memory methods for solving nonlinear equations

N. Choubey^a, J. P. Jaiswal^b

^a Department of Mathematics, Oriental Institute of Science and Technology, Bhopal, M.P., India-462021
^b Department of Mathematics, Maulana Azad National Institute of Technology, Bhopal, M.P., India-462051

Full-text PDF (498 kB) Citations (9)

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DOI: https://doi.org/10.15372/SJNM20170109

Abstract: The main objective and inspiration in the construction of two- and three-point with memory methods is to attain the utmost computational efficiency without any additional function evaluations. At this juncture, we have modified the existing fourth and eighth order without memory methods with optimal order of convergence by means of different approximations of self-accelerating parameters. The parameters are calculated by a Hermite interpolating polynomial, which accelerates the order of convergence of the without memory methods. In particular, the $R$-order convergence of the proposed two- and three-step with memory methods is increased from four to five and eight to ten. One more advantage of these methods is that the condition $f'(x)\ne0$ in the neighborhood of the required root, imposed on Newton's method, can be removed. Numerical comparison is also stated to confirm the theoretical results.

Key words: iterative method, without memory scheme, with memory scheme, computational efficiency, numerical result.

Received: 21.04.2016
Revised: 26.05.2016

English version:
Numerical Analysis and Applications, 2017, Volume 10, Issue 1, Pages 74–89
DOI: https://doi.org/10.1134/S1995423917010086

Bibliographic databases:

Document Type: Article

MSC: 34G20, 74G15, 65B99

Language: Russian

Citation: N. Choubey, J. P. Jaiswal, “Two- and three-point with memory methods for solving nonlinear equations”, Sib. Zh. Vychisl. Mat., 20:1 (2017), 91–106; Num. Anal. Appl., 10:1 (2017), 74–89

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Linking options:

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https://www.mathnet.ru/eng/sjvm/v20/i1/p91

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Shubham Kumar Mittal, Sunil Panday, Lorentz Jäntschi, Liviu C. Bolunduţ, “Two novel efficient memory-based multi-point iterative methods for solving nonlinear equations”, MATH, 10:3 (2025), 5421
Sunil Panday, Shubham Kumar Mittal, Carmen Elena Stoenoiu, Lorentz Jäntschi, “A New Adaptive Eleventh-Order Memory Algorithm for Solving Nonlinear Equations”, Mathematics, 12:12 (2024), 1809
Nishant Kumar, Alicia Cordero, J. P. Jaiswal, Juan R. Torregrosa, “An efficient extension of three-step optimal iterative scheme into with memory and its stability”, J Anal, 2024
Shubham Kumar Mittal, Sunil Panday, Lorentz Jäntschi, “Enhanced Ninth-Order Memory-Based Iterative Technique for Efficiently Solving Nonlinear Equations”, Mathematics, 12:22 (2024), 3490
Ekta Sharma, Shubham Kumar Mittal, J. P. Jaiswal, Sunil Panday, “An Efficient Bi-Parametric With-Memory Iterative Method for Solving Nonlinear Equations”, AppliedMath, 3:4 (2023), 1019
Malik Zaka Ullah, Vali Torkashvand, Stanford Shateyi, Mir Asma, “Using Matrix Eigenvalues to Construct an Iterative Method with the Highest Possible Efficiency Index Two”, Mathematics, 10:9 (2022), 1370
Neha Choubey, J. P. Jaiswal, Abhishek Choubey, “Family of Multipoint with Memory Iterative Schemes for Solving Nonlinear Equations”, Int. J. Appl. Comput. Math, 8:2 (2022)
J. Wang, H. Li, X. Wang, “How the evolution of water transportation conditions and port throughput affected agricultural products logistics industry”, J. Coast. Res., 2020, no. 107, 328–333

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Sibirskii Zhurnal Vychislitel'noi Matematiki

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