SEIQRS model for the transmission of malicious objects in computer network BK Mishra, N Jha Applied Mathematical Modelling 34 (3), 710-715, 2010 | 189 | 2010 |

Fixed period of temporary immunity after run of anti-malicious software on computer nodes BK Mishra, N Jha Applied Mathematics and Computation 190 (2), 1207-1212, 2007 | 135 | 2007 |

A class of variable mesh spline in compression methods for singularly perturbed two point singular boundary value problems RK Mohanty, N Jha Applied Mathematics and Computation 168 (1), 704-716, 2005 | 42 | 2005 |

An O (h4) accurate cubic spline TAGE method for nonlinear singular two point boundary value problems RK Mohanty, PL Sachdev, N Jha Applied Mathematics and Computation 158 (3), 853-868, 2004 | 36 | 2004 |

Spline in compression method for the numerical solution of singularly perturbed two-point singular boundary-value problems RK Mohanty, N Jha, DJ Evans International Journal of Computer Mathematics 81 (5), 615-627, 2004 | 27 | 2004 |

TAGE method for nonlinear singular two point boundary value problem using a fourth order difference scheme RK Mohanty, PL Sachdev, N Jha Neural, Parallel & Scientific Computations 11 (3), 281-296, 2003 | 22 | 2003 |

Swine-origin influenza A (H1N1) in Indian children A Saha, N Jha, NK Dubey, VK Gupta, M Kalaivani Annals of tropical paediatrics 30 (1), 51-55, 2010 | 18 | 2010 |

A fifth order accurate geometric mesh finite difference method for general nonlinear two point boundary value problems N Jha Applied mathematics and computation 219 (16), 8425-8434, 2013 | 12 | 2013 |

New Nonpolynomial Spline in Compression Method of for the Solution of 1D Wave Equation in Polar Coordinates V Gopal, RK Mohanty, N Jha Advances in Numerical Analysis 2013, 2013 | 9 | 2013 |

TAGE iterative algorithm and nonpolynomial spline basis for the solution of nonlinear singular second order ordinary differential equations N Jha, RK Mohanty Applied Mathematics and Computation 218 (7), 3289-3296, 2011 | 9 | 2011 |

Effect of quarantine nodes in SEQIAmS model for the transmission of malicious objects in computer network BK Mishra, PK Nayak, N Jha International journal of mathematical modeling, simulation and applications …, 2009 | 7 | 2009 |

A fifth (six) order accurate, three-point compact finite difference scheme for the numerical solution of sixth order boundary value problems on geometric meshes N Jha, LK Bieniasz Journal of Scientific Computing 64 (3), 898-913, 2015 | 5 | 2015 |

Quintic hyperbolic nonpolynomial spline and finite difference method for nonlinear second order differential equations and its application N Jha, RK Mohanty Journal of the Egyptian Mathematical Society 22 (1), 115-122, 2014 | 5 | 2014 |

Arithmetic average geometric mesh discretizations for fourth and sixth order nonlinear two point boundary value problems RK Mohanty, N JHA, V CHAUHAN Neural, parallel & scientific computations 21 (3-4), 393-410, 2013 | 5 | 2013 |

The application of sixth order accurate parallel quarter sweep alternating group explicit algorithm for nonlinear boundary value problems with singularity N Jha 2010 International Conference on Methods and Models in Computer Science …, 2010 | 5 | 2010 |

A sixth order accurate AGE iterative method for non-linear singular two point boundary value problems RK Mohanty, DJ Evans, N Jha Journal of Computational Methods in Sciences and Engineering 6 (1-4), 57-69, 2006 | 5 | 2006 |

A family of compact finite difference formulations for three-space dimensional nonlinear Poisson’s equations in Cartesian coordinates N Jha, V Gopal, B Singh Differential Equations and Dynamical Systems 26 (1-3), 105-123, 2018 | 3 | 2018 |

A third (four) order accurate, nine-point compact scheme for mildly-nonlinear elliptic equations in two space variables N Jha, N Kumar, KK Sharma Differential Equations and Dynamical Systems 25 (2), 223-237, 2017 | 3 | 2017 |

A fourth-order accurate quasi-variable meshes compact finite-difference scheme for two-space dimensions convection-diffusion problems N Jha, N Kumar Advances in Difference Equations, 2017 | 3 | 2017 |

An exponential expanding meshes sequence and finite difference method adopted for two-dimensional elliptic equations N Jha, N Kumar International Journal of Modeling, Simulation, and Scientific Computing 7 …, 2016 | 3 | 2016 |