Fuzzy Arbitrary Order System: Fuzzy Fractional Differential Equations and Applications S Chakraverty, S Tapaswini, D Behera John Wiley & Sons, 2016 | 92 | 2016 |

Fuzzy Differential Equations and Applications for Engineers and Scientists S Chakraverty, S Tapaswini, D Behera CRC Press, 2016 | 84 | 2016 |

Numerical Solution of Fuzzy Arbitrary Order Predator-Prey Equations S Tapaswini, S Chakraverty Applications and Applied Mathematics: An International Journal (AAM) 8 (2 …, 2013 | 53 | 2013 |

A new approach to fuzzy initial value problem by improved Euler method S Tapaswini, S Chakraverty Fuzzy Information and Engineering 4 (3), 293-312, 2012 | 43 | 2012 |

Euler–based new solution method for fuzzy initial value problems S Tapaswini, S Chakraverty International Journal of Artificial Intelligence and Soft Computing 4 (1), 58-79, 2014 | 36 | 2014 |

Numerical solution of n-th order fuzzy linear differential equations by homotopy perturbation method S Tapaswini, S Chakraverty International Journal of Computer Applications 64 (6), 2013 | 36 | 2013 |

A New Approach to nth Order Fuzzy Differential Equations S Tapaswini, S Chakraverty, T Allahviranloo Computational Mathematics and Modeling 28 (2), 278-300, 2017 | 24 | 2017 |

Dynamic response of imprecisely defined beam subject to various loads using Adomian decomposition method S Tapaswini, S Chakraverty Applied Soft Computing 24, 249-263, 2014 | 21 | 2014 |

New analytical method for solving n− th order fuzzy differential equations S Tapaswini, S Chakraverty ANNALS OF FUZZY MATHEMATICS AND INFORMATICS, 2014 | 19 | 2014 |

Numerical Solution of Uncertain Beam Equations Using Double Parametric Form of Fuzzy Numbers S Tapaswini, S Chakraverty Applied Computational Intelligence and Soft Computing 2013, 1-8, 2013 | 14 | 2013 |

Numerical solution of fuzzy quadratic Riccati diferential equation, Coupled Syst S Tapaswini, S Chakraverty Coupled Systems Mechanics (CSM), An International Journal 2, 255-269, 2013 | 12* | 2013 |

Non-probabilistic solutions of imprecisely defined fractional-order diffusion equations S Chakraverty, S Tapaswini Chinese Physics B 23 (12), 120202, 2014 | 11 | 2014 |

Numerical solution of fuzzy differential equations using orthogonal polynomials S Tapaswini, S Chakraverty International Journal of Computing Science and Mathematics 10 (1), 32-45, 2019 | 9 | 2019 |

Numerical solution of fuzzy boundary value problems using Galerkin method S Tapaswini, S Chakraverty, JJ Nieto Sādhanā 42 (1), 45-61, 2017 | 9 | 2017 |

Numerical solution of the imprecisely defined inverse heat conduction problem S Tapaswini, S Chakraverty, D Behera Chinese Physics B 24 (5), 050203, 2015 | 9 | 2015 |

New Midpoint-based Approach for the Solution of n-th Order Interval Differential Equations S Tapaswini, S Chakraverty Reliable Computing 20, 25-44, 2014 | 9 | 2014 |

Non probabilistic solution of uncertain vibration equation of large membranes using adomian decomposition method S Tapaswini, S Chakraverty The Scientific World Journal 2014 (2014), 2014 | 8 | 2014 |

Analysis of imprecisely defined fuzzy space-fractional telegraph equations S Tapaswini, D Behera Pramana 94 (1), 32, 2020 | 7 | 2020 |

Imprecisely defined fractional-order Fokker–Planck equation subjected to fuzzy uncertainty S Tapaswini, D Behera Pramana 95 (1), 1-9, 2021 | 5 | 2021 |

Non-probabilistic uncertainty analysis of forest fire model by solving fuzzy hyperbolic reaction–diffusion equation S Tapaswini, S Chakraverty Fire Safety Journal 66, 8-14, 2014 | 5 | 2014 |