Numerical solution of second order one dimensional hyperbolic telegraph equation by cubic B-spline collocation method RC Mittal, R Bhatia Applied Mathematics and Computation 220, 496-506, 2013 | 94 | 2013 |

A numerical study of two dimensional hyperbolic telegraph equation by modified B-spline differential quadrature method RC Mittal, R Bhatia Applied Mathematics and Computation 244, 976-997, 2014 | 78 | 2014 |

Numerical solution Of nonlinear sine-Gordon equation by modified cubic B-spline collocation method RC Mittal, R Bhatia International Journal of Partial Differential Equations 2014, 1-8, 2014 | 23 | 2014 |

A collocation method for numerical solution of hyperbolic telegraph equation with neumann boundary conditions RC Mittal, R Bhatia International Journal of Computational Mathematics 2014 (2014), 1-9, 2014 | 20 | 2014 |

Numerical solution of nonlinear system of Klein–Gordon equations by cubic B-spline collocation method RC Mittal, R Bhatia International Journal of Computer Mathematics 92 (10), 2139-2159, 2015 | 11 | 2015 |

Dynamical study of quadrating harvesting of a predator–prey model with Monod–Haldanefunctional response M Kaur, R Rani, R Bhatia Journal of Applied Mathematics and Computing, 2020 | 7 | 2020 |

Numerical Solution of Some Nonlinear Wave Equations Using Modified Cubic B-spline Differential Quadrature Method RC Mittal, R Bhatia International Conference on Advances in Computing, Communications and …, 2014 | 4 | 2014 |

Numerical study of Schrödinger equation using differential quadrature method R Bhatia, RC Mittal International Journal of Applied and Computational Mathematics 4 (1), 36, 2018 | 2 | 2018 |

Dynamical Study of Quadrating harvesting of prey in a Predator-Prey Model following Modified Leslie-Gower type Predation and Crowley-Martin type Functional Response M Kaur, R Rani, R Bhatia International Journal of Control and Automation 12 (5), 699-709, 2019 | | 2019 |