Raziyeh Erfanifar
Orcid: 0000-0001-5186-6179
According to our database1,
Raziyeh Erfanifar authored at least 20 papers
between 2020 and 2026.
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Bibliography
2026
A study on the convergence and efficiency of a novel seventh-order iterative method to solve systems of nonlinear equations with electrical engineering applications.
Math. Comput. Simul., 2026
An efficient high-order iterative method to solve systems of nonlinear equations with applications to differential equations and image processing.
J. Frankl. Inst., 2026
An efficient high-order iterative algorithm for solving systems of nonlinear equations arising in partial and fractional differential equations.
J. Comput. Appl. Math., 2026
A class of iterative methods without inversion based on fixed point iteration to solve nonlinear matrix equations and its application in optimal control.
J. Appl. Math. Comput., 2026
Design and convergence analysis of a new efficient iterative method for solving systems of nonlinear equations with applications in economic dynamics and physical modeling.
Appl. Math. Comput., 2026
2025
An inversion-free iterative method to find the optimal approximate solution of the nonlinear tensor equation ${\mathcal {X}}- {\mathcal {B}}*_n({\mathcal {X}}^{-1}+{\mathcal {A}})^{-1}*_n{\mathcal {B}}^{T}={\mathcal {I}}$.
Comput. Appl. Math., September, 2025
A Family of Iterative Methods Without Inversion to Solve a System of Nonlinear Tensor Equations with Einstein Product.
Circuits Syst. Signal Process., March, 2025
Iterative algorithms based on weight splitting to solve Riccati matrix equation XDX-XC-BX+A=0.
Comput. Appl. Math., February, 2025
Approximation of the tensor square root and applications in nonlinear tensor equations and data whitening.
J. Frankl. Inst., 2025
High-efficiency parametric iterative schemes for solving nonlinear equations with and without memory.
J. Complex., 2025
Int. J. Comput. Math., 2025
2024
Numer. Algorithms, October, 2024
Splitting iteration methods to solve non-symmetric algebraic Riccati matrix equation YAY-YB-CY+D=0.
Numer. Algorithms, October, 2024
On sign function of tensors with Einstein product and its application in solving Yang-Baxter tensor equation.
Comput. Appl. Math., September, 2024
Fixed-Point Iteration Schemes to Solve Symmetric Algebraic Riccati Equation XBX-XA-A<sup>T</sup>X-C=0.
Circuits Syst. Signal Process., June, 2024
Several efficient iterative algorithms for solving nonlinear tensor equation <i>X</i>+<i>A</i><sup>T</sup>*<sub>N</sub> X<sup>-1</sup>*<sub>N</sub> A=<i>I</i> with Einstein product.
Comput. Appl. Math., March, 2024
2023
Weight splitting iteration methods to solve quadratic nonlinear matrix equation MY2+NY+P=0.
J. Frankl. Inst., February, 2023
2022
Convergence analysis of Newton method without inversion for solving discrete algebraic Riccati equations.
J. Frankl. Inst., 2022
An efficient inversion-free method for solving the nonlinear matrix equation Xp+∑j=1mAj*X-qjAj=Q.
J. Frankl. Inst., 2022
2020
On modified two-step iterative method in the fractional sense: some applications in real world phenomena.
Int. J. Comput. Math., 2020