Stability analysis of impulsive functional differential equations IM Stamova Walter de Gruyter, 2009 | 232 | 2009 |

Global Mittag-Leffler stability and synchronization of impulsive fractional-order neural networks with time-varying delays I Stamova Nonlinear Dynamics 77, 1251-1260, 2014 | 227 | 2014 |

Lyapunov–Razumikhin method for impulsive functional differential equations and applications to the population dynamics IM Stamova, GT Stamov Journal of Computational and Applied Mathematics 130 (1-2), 163-171, 2001 | 160 | 2001 |

Applied impulsive mathematical models I Stamova, GT Stamov Springer, 2016 | 148 | 2016 |

Global exponential stability of a class of impulsive cellular neural networks with supremums I Stamova, T Stamov, X Li International Journal of Adaptive Control and Signal Processing 28 (11 …, 2014 | 139 | 2014 |

Functional and impulsive differential equations of fractional order: qualitative analysis and applications I Stamova, G Stamov Crc Press, 2017 | 136 | 2017 |

Mittag-Leffler synchronization of fractional neural networks with time-varying delays and reaction–diffusion terms using impulsive and linear controllers I Stamova, G Stamov Neural Networks 96, 22-32, 2017 | 123 | 2017 |

Almost periodic solutions for impulsive neural networks with delay GT Stamov, IM Stamova Applied Mathematical Modelling 31 (7), 1263-1270, 2007 | 122 | 2007 |

Stability analysis of impulsive functional systems of fractional order I Stamova, G Stamov Communications in Nonlinear Science and Numerical Simulation 19 (3), 702-709, 2014 | 111 | 2014 |

Global exponential stability for impulsive cellular neural networks with time-varying delays S Ahmad, IM Stamova Nonlinear Analysis: Theory, Methods & Applications 69 (3), 786-795, 2008 | 101 | 2008 |

Almost periodicity in impulsive fractional-order reaction–diffusion neural networks with time-varying delays J Cao, G Stamov, I Stamova, S Simeonov IEEE Transactions on Cybernetics 51 (1), 151-161, 2020 | 88 | 2020 |

Vector Lyapunov functions for practical stability of nonlinear impulsive functional differential equations IM Stamova Journal of Mathematical Analysis and Applications 325 (1), 612-623, 2007 | 72 | 2007 |

Asymptotic stability of competitive systems with delays and impulsive perturbations S Ahmad, IM Stamova Journal of Mathematical Analysis and Applications 334 (1), 686-700, 2007 | 68 | 2007 |

Asymptotic stability of an N-dimensional impulsive competitive system S Ahmad, IM Stamova Nonlinear analysis: real world applications 8 (2), 654-663, 2007 | 68 | 2007 |

Mittag-Leffler stability of impulsive differential equations of fractional order I Stamova Quarterly of Applied Mathematics 73 (3), 525-535, 2015 | 66 | 2015 |

On global exponential stability for impulsive cellular neural networks with time-varying delays IM Stamova, R Ilarionov Computers & Mathematics with Applications 59 (11), 3508-3515, 2010 | 66 | 2010 |

Global stability of impulsive fractional differential equations I Stamova Applied Mathematics and Computation 237, 605-612, 2014 | 59 | 2014 |

Design of impulsive controllers and impulsive control strategy for the Mittag-Leffler stability behavior of fractional gene regulatory networks T Stamov, I Stamova Neurocomputing 424, 54-62, 2021 | 57 | 2021 |

Almost necessary and sufficient conditions for survival of species S Ahmad, IM Stamova Nonlinear Analysis: Real World Applications 5 (1), 219-229, 2004 | 50 | 2004 |

Numerical schemes and genetic algorithms for the optimal control of a continuous model of supply chains L Rarità, I Stamova, S Tomasiello Applied Mathematics and Computation 388, 125464, 2021 | 48 | 2021 |