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Compound Markov counting processes and their applications to modeling infinitesimally over-dispersed systems
Author(s):
Bretó, Carles; Ionides, Edward L.
Editor:
Universidad Carlos III de Madrid. Departamento de Estadística
Issued date:
2011-07
Serie/No.:
UC3M Working papers. Statistics and Econometrics
11-14
11-14
Keywords:
Continuous time
,
Counting Markov process
,
Birth-death process
,
Environmental stochasticity
,
Infinitesimal over-dispersion
,
Simultaneous events
Rights:
Atribución-NoComercial-SinDerivadas 3.0 España
Abstract:
We propose an infinitesimal dispersion index for Markov counting processes. We show
that, under standard moment existence conditions, a process is infinitesimally (over-)
equi-dispersed if, and only if, it is simple (compound), i.e. it increases in jumps of
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Compound Markov counting processes and their applications to modeling infinitesimally over-dispersed systems
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