On a class of quadratically convergent iteration formulae V Kanwar, VK Kukreja, S Singh Applied mathematics and Computation 166 (3), 633-637, 2005 | 68 | 2005 |

On some third-order iterative methods for solving nonlinear equations V Kanwar, VK Kukreja, S Singh Applied Mathematics and Computation 171 (1), 272-280, 2005 | 55 | 2005 |

An optimal fourth-order family of methods for multiple roots and its dynamics R Behl, A Cordero, SS Motsa, JR Torregrosa, V Kanwar Numerical Algorithms 71, 775-796, 2016 | 53 | 2016 |

Modified families of Newton, Halley and Chebyshev methods V Kanwar, SK Tomar Applied Mathematics and Computation 192 (1), 20-26, 2007 | 41 | 2007 |

On some modified families of multipoint iterative methods for multiple roots of nonlinear equations S Kumar, V Kanwar, S Singh Applied Mathematics and Computation 218 (14), 7382-7394, 2012 | 31 | 2012 |

Simply constructed family of a Ostrowski’s method with optimal order of convergence V Kanwar, R Behl, KK Sharma Computers & Mathematics with Applications 62 (11), 4021-4027, 2011 | 31 | 2011 |

New two-parameter Chebyshev–Halley-like family of fourth and sixth-order methods for systems of nonlinear equations M Narang, S Bhatia, V Kanwar Applied Mathematics and Computation 275, 394-403, 2016 | 29 | 2016 |

An efficient optimized adaptive step-size hybrid block method for integrating differential systems G Singh, A Garg, V Kanwar, H Ramos Applied Mathematics and Computation 362, 124567, 2019 | 25 | 2019 |

General efficient class of Steffensen type methods with memory for solving systems of nonlinear equations M Narang, S Bhatia, AS Alshomrani, V Kanwar Journal of Computational and Applied Mathematics 352, 23-39, 2019 | 24 | 2019 |

New optimal class of higher-order methods for multiple roots, permitting f′(xn)= 0 V Kanwar, S Bhatia, M Kansal Applied Mathematics and Computation 222, 564-574, 2013 | 23 | 2013 |

Simple geometric constructions of quadratically and cubically convergent iterative functions to solve nonlinear equations V Kanwar, S Singh, S Bakshi Numerical Algorithms 47, 95-107, 2008 | 22 | 2008 |

Higher-order derivative-free families of Chebyshev–Halley type methods with or without memory for solving nonlinear equations IK Argyros, M Kansal, V Kanwar, S Bajaj Applied Mathematics and Computation 315, 224-245, 2017 | 21 | 2017 |

An efficient variable step-size rational Falkner-type method for solving the special second-order IVP H Ramos, G Singh, V Kanwar, S Bhatia Applied Mathematics and Computation 291, 39-51, 2016 | 21 | 2016 |

On some optimal multiple root-finding methods and their dynamics M Kansal, V Kanwar, S Bhatia Applications and Applied Mathematics: An International Journal (AAM) 10 (1), 22, 2015 | 20 | 2015 |

Optimal equi-scaled families of Jarratt's method R Behl, V Kanwar, KK Sharma International Journal of Computer Mathematics 90 (2), 408-422, 2013 | 19 | 2013 |

Variants of Chebyshev’s method with optimal order of convergence R Behl, V Kanwar Tamsui Oxford Journal of Information and Mathematical Sciences 29 (1), 39-53, 2013 | 17 | 2013 |

Geometrically constructed families of Newton's method for unconstrained optimization and nonlinear equations S Kumar, V Kanwar, SK Tomar, S Singh International Journal of Mathematics and Mathematical Sciences 2011, 2011 | 16 | 2011 |

A new family of Secant-like method with super-linear convergence V Kanwar, JR Sharma Applied mathematics and computation 171 (1), 104-107, 2005 | 16 | 2005 |

Efficient derivative-free variants of Hansen-Patrick’s family with memory for solving nonlinear equations M Kansal, V Kanwar, S Bhatia Numerical algorithms 73, 1017-1036, 2016 | 15 | 2016 |

New modifications of Hansen–Patrick’s family with optimal fourth and eighth orders of convergence M Kansal, V Kanwar, S Bhatia Applied Mathematics and Computation 269, 507-519, 2015 | 14 | 2015 |