Time-fractional telegraph equations and telegraph processes with Brownian time E Orsingher, L Beghin Probability Theory and Related Fields 128 (1), 141-160, 2004 | 315 | 2004 |

Fractional Poisson processes and related planar random motions L Beghin, E Orsingher | 198 | 2009 |

Probability law, flow function, maximum distribution of wave-governed random motions and their connections with Kirchoff's laws E Orsingher Stochastic Processes and their Applications 34 (1), 49-66, 1990 | 141 | 1990 |

Fractional diffusion equations and processes with randomly varying time E Orsingher, L Beghin | 129 | 2009 |

The space-fractional telegraph equation and the related fractional telegraph process E Orsingher, X Zhao Chinese Annals of Mathematics 24 (01), 45-56, 2003 | 111 | 2003 |

Poisson-type processes governed by fractional and higher-order recursive differential equations L Beghin, E Orsingher | 97 | 2010 |

The space-fractional Poisson process E Orsingher, F Polito Statistics & Probability Letters 82 (4), 852-858, 2012 | 92 | 2012 |

Some universal limits for nonhomogeneous birth and death processes A Zeifman, S Leorato, E Orsingher, Y Satin, G Shilova Queueing systems 52, 139-151, 2006 | 91 | 2006 |

Random flights in higher spaces E Orsingher, A De Gregorio Journal of Theoretical Probability 20, 769-806, 2007 | 89 | 2007 |

A planar random motion with an infinite number of directions controlled by the damped wave equation AD Kolesnik, E Orsingher Journal of Applied Probability 42 (4), 1168-1182, 2005 | 71 | 2005 |

On the maximum of the generalized Brownian bridge L Beghin, E Orsingher Lithuanian Mathematical Journal 39, 157-167, 1999 | 64 | 1999 |

Probabilistic analysis of the telegrapher's process with drift by means of relativistic transformations L Beghin, L Nieddu, E Orsingher Journal of Applied Mathematics and Stochastic Analysis 14 (1), 11-25, 2001 | 63 | 2001 |

Fractional pure birth processes E Orsingher, F Polito | 62 | 2010 |

The telegraph process stopped at stable-distributed times and its connection with the fractional telegraph equation L Beghin, E Orsingher Fractional Calculus & Applied Analysis 6, 187-204, 2003 | 58 | 2003 |

Motions with reflecting and absorbing barriers driven by the telegraph equation E Orsingher Walter de Gruyter, Berlin/New York 3 (1), 9-22, 1995 | 55 | 1995 |

Composition of stochastic processes governed by higher-order parabolic and hyperbolic equations KJ Hochberg, E Orsingher Journal of Theoretical Probability 9, 511-532, 1996 | 54 | 1996 |

Time-changed processes governed by space-time fractional telegraph equations M D’ovidio, E Orsingher, B Toaldo Stochastic Analysis and Applications 32 (6), 1009-1045, 2014 | 50 | 2014 |

Hyperbolic equations arising in random models E Orsingher Stochastic Processes and their Applications 21 (1), 93-106, 1985 | 50 | 1985 |

A planar random motion governed by the two-dimensional telegraph equation E Orsingher Journal of applied probability 23 (2), 385-397, 1986 | 49 | 1986 |

On a fractional linear birth–death process E Orsingher, F Polito | 44 | 2011 |