Fractional-order Legendre functions for solving fractional-order differential equations S Kazem, S Abbasbandy, S Kumar Applied Mathematical Modelling 37 (7), 5498-5510, 2013 | 319 | 2013 |

Exact solution of some linear fractional differential equations by Laplace transform S Kazem International Journal of nonlinear science 16 (1), 3-11, 2013 | 135 | 2013 |

An integral operational matrix based on Jacobi polynomials for solving fractional-order differential equations S Kazem Applied Mathematical Modelling 37 (3), 1126-1136, 2013 | 96 | 2013 |

A novel application of radial basis functions for solving a model of first-order integro-ordinary differential equation K Parand, S Abbasbandy, S Kazem, JA Rad Communications in Nonlinear Science and Numerical Simulation 16 (11), 4250-4258, 2011 | 75 | 2011 |

Numerical solution of fractional differential equations with a Tau method based on Legendre and Bernstein polynomials JA Rad, S Kazem, M Shaban, K Parand, A Yildirim Mathematical Methods in the Applied Sciences 37 (3), 329-342, 2014 | 68 | 2014 |

Radial basis functions methods for solving Fokker–Planck equation S Kazem, JA Rad, K Parand Engineering Analysis with Boundary Elements 36 (2), 181-189, 2012 | 64 | 2012 |

An improved numerical method for a class of astrophysics problems based on radial basis functions K Parand, S Abbasbandy, S Kazem, AR Rezaei Physica Scripta 83 (1), 015011, 2011 | 57 | 2011 |

Optimal control of a parabolic distributed parameter system via radial basis functions JA Rad, S Kazem, K Parand Communications in Nonlinear Science and Numerical Simulation 19 (8), 2559-2567, 2014 | 51 | 2014 |

Comparison between two common collocation approaches based on radial basis functions for the case of heat transfer equations arising in porous medium K Parand, S Abbasbandy, S Kazem, AR Rezaei Communications in Nonlinear Science and Numerical Simulation 16 (3), 1396-1407, 2011 | 50 | 2011 |

Radial basis functions method for solving of a non-local boundary value problem with Neumann’s boundary conditions S Kazem, JA Rad Applied Mathematical Modelling 36 (6), 2360-2369, 2012 | 44 | 2012 |

A numerical solution of the nonlinear controlled Duffing oscillator by radial basis functions JA Rad, S Kazem, K Parand Computers & Mathematics with Applications 64 (6), 2049-2065, 2012 | 43 | 2012 |

Application of the operational matrix of fractional-order Legendre functions for solving the time-fractional convection–diffusion equation S Abbasbandy, S Kazem, MS Alhuthali, HH Alsulami Applied Mathematics and Computation 266, 31-40, 2015 | 42 | 2015 |

A new method for solving steady flow of a third-grade fluid in a porous half space based on radial basis functions S Kazem, JA Rad, K Parand, S Abbasbandy Zeitschrift für Naturforschung A 66 (10-11), 591-598, 2011 | 40 | 2011 |

Improved analytical solutions to a stagnation-point flow past a porous stretching sheet with heat generation S Kazem, M Shaban, S Abbasbandy Journal of the Franklin Institute 348 (8), 2044-2058, 2011 | 40 | 2011 |

On a generalized Gaussian radial basis function: Analysis and applications N Karimi, S Kazem, D Ahmadian, H Adibi, LV Ballestra Engineering analysis with boundary elements 112, 46-57, 2020 | 33 | 2020 |

A modification of the homotopy analysis method based on Chebyshev operational matrices M Shaban, S Kazem, JA Rad Mathematical and Computer Modelling 57 (5-6), 1227-1239, 2013 | 33 | 2013 |

A meshless method on non-Fickian flows with mixing length growth in porous media based on radial basis functions: A comparative study S Kazem, JA Rad, K Parand Computers & Mathematics with Applications 64 (4), 399-412, 2012 | 33 | 2012 |

Rational and exponential legendre tau method on steady flow of a third grade fluid in a porous half space F Baharifard, S Kazem, K Parand International Journal of Applied and Computational Mathematics 2, 679-698, 2016 | 30 | 2016 |

The numerical study on the unsteady flow of gas in a semi-infinite porous medium using an RBF collocation method S Kazem, JA Rad, K Parand, M Shaban, H Saberi International Journal of Computer Mathematics 89 (16), 2240-2258, 2012 | 30 | 2012 |

Application of finite difference method of lines on the heat equation S Kazem, M Dehghan Numerical Methods for Partial Differential Equations 34 (2), 626-660, 2018 | 23 | 2018 |