| A novel iterative method for the solution of a nonlinear matrix equation R Erfanifar, K Sayevand, H Esmaeili Applied Numerical Mathematics 153, 503-518, 2020 | 22 | 2020 |
| On modified two-step iterative method in the fractional sense: some applications in real world phenomena R Erfanifar, K Sayevand, H Esmaeili International Journal of Computer Mathematics 97 (10), 2109-2141, 2020 | 16 | 2020 |
| A modified Chebyshev ϑ‐weighted Crank–Nicolson method for analyzing fractional sub‐diffusion equations R Erfanifar, K Sayevand, N Ghanbari, H Esmaeili Numerical Methods for Partial Differential Equations 37 (1), 614-625, 2021 | 11 | 2021 |
| On computational efficiency and dynamical analysis for a class of novel multi-step iterative schemes K Sayevand, R Erfanifar, H Esmaeili International Journal of Applied and Computational Mathematics 6 (6), 163, 2020 | 11 | 2020 |
| An efficient inversion-free method for solving the nonlinear matrix equation Xp+∑ j= 1mAj* X− qjAj= Q R Erfanifar, K Sayevand, M Hajarian Journal of the Franklin Institute 359 (7), 3071-3089, 2022 | 9 | 2022 |
| Solving system of nonlinear matrix equations over Hermitian positive definite matrices R Erfanifar, K Sayevand, M Hajarian Linear and Multilinear Algebra 71 (4), 597-630, 2023 | 8 | 2023 |
| On the calculation of the Moore–Penrose and Drazin inverses: Application to fractional calculus K Sayevand, A Pourdarvish, JAT Machado, R Erfanifar Mathematics 9 (19), 2501, 2021 | 7 | 2021 |
| A Fourth-order iterative method for computing the Moore-Penrose inverse H Esmaeili, R Erfanifar, M Rashidi Journal of Hyperstructures 6 (1), 52-67, 2017 | 7 | 2017 |
| The maximal positive definite solution of the nonlinear matrix equation K Sayevand, R Erfanifar, H Esmaeili Mathematical Sciences 17 (4), 337-350, 2023 | 5 | 2023 |
| Convergence analysis of Newton method without inversion for solving discrete algebraic Riccati equations R Erfanifar, K Sayevand, M Hajarian Journal of the Franklin Institute 359 (14), 7540-7561, 2022 | 4 | 2022 |
| A family of iterative methods to solve nonlinear problems with applications in fractional differential equations R Erfanifar, M Hajarian, K Sayevand Mathematical Methods in the Applied Sciences 47 (4), 2099-2119, 2024 | 3 | 2024 |
| A new multi-step method for solving nonlinear systems with high efficiency indices R Erfanifar, M Hajarian Numerical Algorithms, 1-26, 2024 | 3 | 2024 |
| A class of efficient derivative free iterative method with and without memory for solving nonlinear equations R Erfanifar Computational Mathematics and Computer Modeling with Applications (CMCMA) 1 …, 2022 | 3 | 2022 |
| Weight splitting iteration methods to solve quadratic nonlinear matrix equation MY2+ NY+ P= 0 R Erfanifar, M Hajarian Journal of the Franklin Institute 360 (3), 1904-1928, 2023 | 2 | 2023 |
| An efficient method to compute the Moore–Penrose inverse H Esmaeili, R Erfanifar, M Rashidi Advances in Pure and Applied Mathematics 9 (2), 143-152, 2018 | 2 | 2018 |
| Solving system of nonlinear equations by using a new three-step method M Ahmadi, H Esmaeili, R Erfanifar Control and Optimization in Applied Mathematics 1 (2), 53-62, 2016 | 2 | 2016 |
| Splitting iteration methods to solve non-symmetric algebraic Riccati matrix equation R Erfanifar, M Hajarian Numerical Algorithms, 1-26, 2023 | 1 | 2023 |
| A novel iterative method to find the Moore–Penrose inverse of a tensor with Einstein product R Erfanifar, M Hajarian, K Sayevand Numer Math: Theory Methods Appl, 1-32, 2023 | 1 | 2023 |
| An efficient iterative method for finding the Moore-Penrose and Drazin inverse of a matrix R Erfanifar Computational Mathematics and Computer Modeling with Applications (CMCMA) 1 …, 2022 | 1 | 2022 |
| An optimal sixteenth order convergent method to solve nonlinear equations H Esmaeili, M Ahmadi, R Erfanifar Lecturas matemáticas 36 (2), 167-177, 2015 | 1 | 2015 |
Khosro SayevandMalayer University, Malayer, IRAN Verified email at malayeru.ac.irVerified email at malayeru.ac.ir
