Mesure invariante d'une equation integrale stochastique a coefficients periodiques et applications a un modele d'epidemiologie

Elisabetta Tornatore

Mesure invariante d'une equation integrale stochastique a coefficients periodiques et applications a un modele d'epidemiologie

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Abstract

We consider a stochastic integral equation, whose coe cients are periodicin time. Under a suitable condition we prove the existence of an invariant mesure for thisstochastic equation. This invariant mesure is constructed on a Banach space of continuousfunctions. We study also its application to an epidemiologic model of malaria, whichconcerns the infected population and the vector population.

Lingua originale	French
pagine (da-a)	27-44
Numero di pagine	18
Rivista	AFRICA MATHEMATICS ANNALS
Volume	3
Stato di pubblicazione	Published - 2012

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author = "Elisabetta Tornatore",

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AU - Tornatore, Elisabetta

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N2 - We consider a stochastic integral equation, whose coe cients are periodicin time. Under a suitable condition we prove the existence of an invariant mesure for thisstochastic equation. This invariant mesure is constructed on a Banach space of continuousfunctions. We study also its application to an epidemiologic model of malaria, whichconcerns the infected population and the vector population.

AB - We consider a stochastic integral equation, whose coe cients are periodicin time. Under a suitable condition we prove the existence of an invariant mesure for thisstochastic equation. This invariant mesure is constructed on a Banach space of continuousfunctions. We study also its application to an epidemiologic model of malaria, whichconcerns the infected population and the vector population.

KW - epidemiological model

KW - integral stochastic equation

KW - invariant measure

KW - epidemiological model

KW - integral stochastic equation

KW - invariant measure

UR - http://hdl.handle.net/10447/64919

M3 - Article

SN - 2218-4414

VL - 3

SP - 27

EP - 44

JO - AFRICA MATHEMATICS ANNALS

JF - AFRICA MATHEMATICS ANNALS

ER -