Title of article
A note on fractional linear pure birth and pure death processes in epidemic models
Author/Authors
Garra، نويسنده , , Roberto and Polito، نويسنده , , Federico، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2011
Pages
6
From page
3704
To page
3709
Abstract
In this note we highlight the role of fractional linear birth and linear death processes, recently studied in Orsingher et al. (2010) [5] and Orsingher and Polito (2010) [6], in relation to epidemic models with empirical power law distribution of the events. Taking inspiration from a formal analogy between the equation for self-consistency of the epidemic type aftershock sequences (ETAS) model and the fractional differential equation describing the mean value of fractional linear growth processes, we show some interesting applications of fractional modelling in studying ab initio epidemic processes without the assumption of any empirical distribution. We also show that, in the framework of fractional modelling, subcritical regimes can be linked to linear fractional death processes and supercritical regimes to linear fractional birth processes.
er we discuss a simple toy model in order to underline the possible application of these stochastic growth models to more general epidemic phenomena such as tumoral growth.
Keywords
Wiener–Hopf integral , ETAS model , Mittag-Leffler functions , Death process , Birth process , Fractional branching
Journal title
Physica A Statistical Mechanics and its Applications
Serial Year
2011
Journal title
Physica A Statistical Mechanics and its Applications
Record number
1739390
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