On the convergence of He's variational iteration method M Tatari, M Dehghan Journal of Computational and Applied Mathematics 207 (1), 121-128, 2007 | 325 | 2007 |

Application of the Adomian decomposition method for the Fokker–Planck equation M Tatari, M Dehghan, M Razzaghi Mathematical and Computer Modelling 45 (5-6), 639-650, 2007 | 145 | 2007 |

A method for solving partial differential equations via radial basis functions: Application to the heat equation M Tatari, M Dehghan Engineering Analysis with Boundary Elements 34 (3), 206-212, 2010 | 108 | 2010 |

Determination of a control parameter in a one-dimensional parabolic equation using the method of radial basis functions M Dehghan, M Tatari Mathematical and Computer Modelling 44 (11-12), 1160-1168, 2006 | 108 | 2006 |

The use of He's variational iteration method for solving a Fokker–Planck equation M Dehghan, M Tatari Physica Scripta 74 (3), 310, 2006 | 105 | 2006 |

On the solution of the non-local parabolic partial differential equations via radial basis functions M Tatari, M Dehghan Applied Mathematical Modelling 33 (3), 1729-1738, 2009 | 98 | 2009 |

Identifying an unknown function in a parabolic equation with overspecified data via He’s variational iteration method M Dehghan, M Tatari Chaos, Solitons & Fractals 36 (1), 157-166, 2008 | 98 | 2008 |

He’s variational iteration method for computing a control parameter in a semi-linear inverse parabolic equation M Tatari, M Dehghan Chaos, Solitons & Fractals 33 (2), 671-677, 2007 | 94 | 2007 |

Solution of problems in calculus of variations via He's variational iteration method M Tatari, M Dehghan Physics Letters A 362 (5-6), 401-406, 2007 | 87 | 2007 |

Numerical solution of Laplace equation in a disk using the Adomian decomposition method M Tatari, M Dehghan Physica Scripta 72 (5), 345, 2005 | 86 | 2005 |

The use of the Adomian decomposition method for solving multipoint boundary value problems M Tatari, M Dehghan Physica Scripta 73 (6), 672, 2006 | 85 | 2006 |

The use of Adomian decomposition method for solving problems in calculus of variations M Dehghan, M Tatari Mathematical Problems in Engineering 2006, 2006 | 66 | 2006 |

Improvement of He’s variational iteration method for solving systems of differential equations M Tatari, M Dehghan Computers & Mathematics with Applications 58 (11-12), 2160-2166, 2009 | 64 | 2009 |

Use of radial basis functions for solving the second‐order parabolic equation with nonlocal boundary conditions M Dehghan, M Tatari Numerical Methods for Partial Differential Equations: An International …, 2008 | 49 | 2008 |

Finding approximate solutions for a class of third-order non-linear boundary value problems via the decomposition method of Adomian M Dehghan, M Tatari International Journal of Computer Mathematics 87 (6), 1256-1263, 2010 | 46 | 2010 |

An adaptive meshless local Petrov–Galerkin method based on a posteriori error estimation for the boundary layer problems M Kamranian, M Dehghan, M Tatari Applied Numerical Mathematics 111, 181-196, 2017 | 25 | 2017 |

Solution of a semilinear parabolic equation with an unknown control function using the decomposition procedure of Adomian M Dehghan, M Tatari Numerical Methods for Partial Differential Equations: An International …, 2007 | 25 | 2007 |

The radial basis functions method for identifying an unknown parameter in a parabolic equation with overspecified data M Dehghan, M Tatari Numerical Methods for Partial Differential Equations: An International …, 2007 | 24 | 2007 |

A generalized Laguerre–Legendre spectral collocation method for solving initial-boundary value problems M Tatari, M Haghighi Applied Mathematical Modelling 38 (4), 1351-1364, 2014 | 22 | 2014 |

The finite point method for reaction-diffusion systems in developmental biology M Tatari, M Kamranian, M Dehghan Computer Modeling in Engineering & Sciences(CMES) 82 (1), 1-27, 2011 | 20 | 2011 |