Full characterization of the fractional Poisson process

The fractional Poisson process (FPP) is a counting process with independent and identically distributed inter-event times following the Mittag-Leffler distribution. This process is very useful in several fields of applied and theoretical physics including models for anomalous diffusion. Contrary to the well-known Poisson process, the fractional Poisson process does not have stationary and independent increments. It is not a L\'evy process and it is not a Markov process. In this letter, we present formulae for its finite-dimensional distribution functions, fully characterizing the process. These exact analytical results are compared to Monte Carlo simulations.

[1]  October I Physical Review Letters , 2022 .

[2]  Hendrik B. Geyer,et al.  Journal of Physics A - Mathematical and General, Special Issue. SI Aug 11 2006 ?? Preface , 2006 .

[3]  Federico Polito,et al.  The space-fractional Poisson process , 2011, 1107.2874.

[4]  Marco Raberto,et al.  Anomalous waiting times in high-frequency financial data , 2003, cond-mat/0310305.

[5]  J. Norris Appendix: probability and measure , 1997 .

[6]  Andrew Gelman,et al.  Bursts: The Hidden Pattern Behind Everything We Do , 2010 .

[7]  B. Swart,et al.  Quantitative Finance , 2006, Metals and Energy Finance.

[8]  C. Macci,et al.  Large deviations for fractional Poisson processes , 2012, 1204.1446.

[9]  R. Rosenfeld Nature , 2009, Otolaryngology--head and neck surgery : official journal of American Academy of Otolaryngology-Head and Neck Surgery.

[10]  L. Bortkiewicz,et al.  Das Gesetz der kleinen Zahlen , 1898 .