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Xiaofeng Wang

Orcid: 0000-0001-8524-6488

Affiliations:
  • Bohai University, School of Mathematics and Physics, Jinzhou, China
  • Northeastern University, College of Sciences, Shenyang, China (former)


According to our database1, Xiaofeng Wang authored at least 18 papers between 2012 and 2024.

Collaborative distances:
  • Dijkstra number2 of five.
  • Erdős number3 of four.

Timeline

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Links

Online presence:

On csauthors.net:

Bibliography

2024
Ball convergence analysis of Jarratt-type sixth-order method and its applications in solving some chemical problems.
[BibTeX]
[DOI]
Wenshuo Li
,
Xiaofeng Wang
Comput. Appl. Math., February, 2024

2023
An Optimal Eighth-Order One-Parameter Single-Root Finder: Chaotic Dynamics and Stability Analysis.
[BibTeX]
[DOI]
Wenshuo Li
,
Xiaofeng Wang
Int. J. Bifurc. Chaos, December, 2023

Stability Analysis of Simple Root Seeker for Nonlinear Equation.
[BibTeX]
[DOI]
Xiaofeng Wang
,
Wenshuo Li
Axioms, February, 2023

2021
Derivative-Free Iterative Methods with Some Kurchatov-Type Accelerating Parameters for Solving Nonlinear Systems.
[BibTeX]
[DOI]
Xiaofeng Wang
,
Yingfanghua Jin
,
Yali Zhao
Symmetry, 2021

Fixed-Point Iterative Method with Eighth-Order Constructed by Undetermined Parameter Technique for Solving Nonlinear Systems.
[BibTeX]
[DOI]
Xiaofeng Wang
Symmetry, 2021

2018
An Ostrowski-type method with memory using a novel self-accelerating parameter.
[BibTeX]
[DOI]
Xiaofeng Wang
J. Comput. Appl. Math., 2018

A new accelerating technique applied to a variant of Cordero-Torregrosa method.
[BibTeX]
[DOI]
Xiaofeng Wang
J. Comput. Appl. Math., 2018

A family of Newton-type iterative methods using some special self-accelerating parameters.
[BibTeX]
[DOI]
Xiaofeng Wang
Int. J. Comput. Math., 2018

2017
An Efficient Sixth-Order Newton-Type Method for Solving Nonlinear Systems.
[BibTeX]
[DOI]
Xiaofeng Wang
,
Yang Li
Algorithms, 2017

2016
Efficient two-step derivative-free iterative methods with memory and their dynamics.
[BibTeX]
[DOI]
Xiaofeng Wang
,
Tie Zhang
,
Yuping Qin
Int. J. Comput. Math., 2016

Two Efficient Derivative-Free Iterative Methods for Solving Nonlinear Systems.
[BibTeX]
[DOI]
Xiaofeng Wang
,
Xiaodong Fan
Algorithms, 2016

2015
Seventh-order derivative-free iterative method for solving nonlinear systems.
[BibTeX]
[DOI]
Xiaofeng Wang
,
Tie Zhang
,
Wei-Yi Qian
,
Mingyan Teng
Numer. Algorithms, 2015

Efficient n-point iterative methods with memory for solving nonlinear equations.
[BibTeX]
[DOI]
Xiaofeng Wang
,
Tie Zhang
Numer. Algorithms, 2015

A Family of Newton Type Iterative Methods for Solving Nonlinear Equations.
[BibTeX]
[DOI]
Xiaofeng Wang
,
Yuping Qin
,
Wei-Yi Qian
,
Sheng Zhang
,
Xiaodong Fan
Algorithms, 2015

2014
An efficient iterative method with order five for solving nonlinear systems.
[BibTeX]
[DOI]
Xiaofeng Wang
,
Tie Zhang
,
Fu Zheng
,
Wei-Yi Qian
J. Comput. Methods Sci. Eng., 2014

Optimal eighth-order Steffensen type methods for solving nonlinear equations.
[BibTeX]
[DOI]
Xiaofeng Wang
,
Tie Zhang
J. Comput. Methods Sci. Eng., 2014

2013
A family of Steffensen type methods with seventh-order convergence.
[BibTeX]
[DOI]
Xiaofeng Wang
,
Tie Zhang
Numer. Algorithms, 2013

2012
On an efficient family of derivative free three-point methods for solving nonlinear equations.
[BibTeX]
[DOI]
Xiaofeng Wang
,
Jovana Dzunic
,
Tie Zhang
Appl. Math. Comput., 2012


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