A practical guide to Prabhakar fractional calculus A Giusti, I Colombaro, R Garra, R Garrappa, F Polito, M Popolizio, ... Fractional Calculus and Applied Analysis 23 (1), 9-54, 2020 | 101 | 2020 |

Acceleration techniques for approximating the matrix exponential operator M Popolizio, V Simoncini SIAM Journal on Matrix Analysis and Applications 30 (2), 657-683, 2008 | 86 | 2008 |

Computing the matrix Mittag-Leffler function with applications to fractional calculus R Garrappa, M Popolizio Journal of Scientific Computing 77 (1), 129-153, 2018 | 79 | 2018 |

Evaluation of generalized Mittag–Leffler functions on the real line R Garrappa, M Popolizio Advances in Computational Mathematics 39 (1), 205-225, 2013 | 77 | 2013 |

On the use of matrix functions for fractional partial differential equations R Garrappa, M Popolizio Mathematics and Computers in Simulation 81 (5), 1045-1056, 2011 | 72 | 2011 |

On accurate product integration rules for linear fractional differential equations R Garrappa, M Popolizio Journal of Computational and Applied Mathematics 235 (5), 1085-1097, 2011 | 70 | 2011 |

Evaluation of fractional integrals and derivatives of elementary functions: Overview and tutorial R Garrappa, E Kaslik, M Popolizio Mathematics 7 (5), 407, 2019 | 67 | 2019 |

Solving the time-fractional Schrödinger equation by Krylov projection methods R Garrappa, I Moret, M Popolizio Journal of Computational Physics 293, 115-134, 2015 | 62 | 2015 |

Generalized exponential time differencing methods for fractional order problems R Garrappa, M Popolizio Computers & Mathematics with Applications 62 (3), 876-890, 2011 | 60 | 2011 |

Numerical solution of multiterm fractional differential equations using the matrix Mittag–Leffler functions M Popolizio Mathematics 6 (1), 7, 2018 | 31 | 2018 |

On the time-fractional Schrödinger equation: Theoretical analysis and numerical solution by matrix Mittag-Leffler functions R Garrappa, I Moret, M Popolizio Computers & Mathematics with Applications 74 (5), 977-992, 2017 | 25 | 2017 |

The restarted shift‐and‐invert Krylov method for matrix functions I Moret, M Popolizio Numerical Linear Algebra with Applications 21 (1), 68-80, 2014 | 23 | 2014 |

A matrix approach for partial differential equations with Riesz space fractional derivatives M Popolizio The European Physical Journal Special Topics 222 (8), 1975-1985, 2013 | 21 | 2013 |

On stochasticity preserving methods for the computation of the matrix pth root T Politi, M Popolizio Mathematics and Computers in Simulation 110, 53-68, 2015 | 13 | 2015 |

On the matrix Mittag–Leffler function: theoretical properties and numerical computation M Popolizio Mathematics 7 (12), 1140, 2019 | 12 | 2019 |

Exponential quadrature rules for linear fractional differential equations R Garrappa, M Popolizio Mediterranean Journal of Mathematics 12 (1), 219-244, 2015 | 10 | 2015 |

Time-domain simulation for fractional relaxation of Havriliak-Negami type R Garrappa, G Maione, M Popolizio ICFDA'14 International Conference on Fractional Differentiation and Its …, 2014 | 7 | 2014 |

: Evaluation of generalized Mittag-Leffler functions on the real line. Adv. Comput. Math. 39 (1), 205-225 R Garrappa, M Popolizio | 6 | 2013 |

RADON project: an innovative system to manage gas radon in civil buildings A Amato, R Calienno, R Dario, V Di Lecce, C Guaragnella, C Marzocca, ... 2019 II Workshop on Metrology for Industry 4.0 and IoT (MetroInd4. 0&IoT …, 2019 | 5 | 2019 |

Schur decomposition methods for the computation of rational matrix functions T Politi, M Popolizio International Conference on Computational Science, 708-715, 2006 | 4 | 2006 |