Dynamics of a predator-prey model with disease in the predator

被引：34

作者：

Pal, Pallav Jyoti ^{[1
]}

Haque, Mainul ^{[2
]}

Mandal, Prashanta Kumar ^{[1
]}

机构：

[1] Dumkal Inst Engn & Technol, Dept Math, Murshidabad 742406, W Bengal, India

[2] Univ Nottingham Hosp, Sch Clin Sci, Univ Div Anaesthesia & Intens Care, Nottingham NG7 2UH, England

来源：

MATHEMATICAL METHODS IN THE APPLIED SCIENCES | 2014年 / 37卷 / 16期

关键词：

Eco-epidemiology; stability; Hopf bifurcation; periodic solutions; permanence; global stability; PERSISTENCE;

D O I：

10.1002/mma.2988

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

The present investigation deals with a predator-prey model with disease that spreads among the predator species only. The predator species is split out into two groups-the susceptible predator and the infected predator both of which feeds on prey species. The stability and bifurcation analyses are carried out and discussed at length. On the basis of the normal form theory and centermanifold reduction, the explicit formulae are derived to determine stability and direction of Hopf bifurcating periodic solution. An extensive quantitative analysis has been performed in order to validate the applicability of ourmodel under consideration. Copyright (C) 2013 John Wiley & Sons, Ltd.

引用

页码：2429 / 2450

页数：22

共 29 条

[1]

ANDERSON R M, 1991

[2] THE INVASION, PERSISTENCE AND SPREAD OF INFECTIOUS-DISEASES WITHIN ANIMAL AND PLANT-COMMUNITIES [J].

ANDERSON, RM ;

MAY, RM .

PHILOSOPHICAL TRANSACTIONS OF THE ROYAL SOCIETY OF LONDON SERIES B-BIOLOGICAL SCIENCES, 1986, 314 (1167) :533-570

[3] THE POPULATION-DYNAMICS OF MICRO-PARASITES AND THEIR INVERTEBRATE HOSTS [J].

ANDERSON, RM ;

MAY, RM .

PHILOSOPHICAL TRANSACTIONS OF THE ROYAL SOCIETY B-BIOLOGICAL SCIENCES, 1981, 291 (1054) :451-524

[4] MODELING THE ROLE OF VIRAL DISEASE IN RECURRENT PHYTOPLANKTON BLOOMS [J].

BELTRAMI, E ;

CARROLL, TO .

JOURNAL OF MATHEMATICAL BIOLOGY, 1994, 32 (08) :857-863

[5] Modeling and analysis of a marine bacteriophage infection [J].

Beretta, E ;

Kuang, Y .

MATHEMATICAL BIOSCIENCES, 1998, 149 (01) :57-76

[6]

Birkhoff G., 1962, ORDINARY DIFFERENTIA

[7] UNIFORMLY PERSISTENT SYSTEMS [J].

BUTLER, G ;

FREEDMAN, HI ;

WALTMAN, P .

PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY, 1986, 96 (03) :425-430

[8] A MODEL OF PREDATOR PREY DYNAMICS AS MODIFIED BY THE ACTION OF A PARASITE [J].

FREEDMAN, HI .

MATHEMATICAL BIOSCIENCES, 1990, 99 (02) :143-155

[9]

Freedman HI., 1980, DETERMINISTIC MATH M

[10] PERSISTENCE IN FOOD WEBS .1. LOTKA-VOLTERRA FOOD-CHAINS [J].

GARD, TC ;

HALLAM, TG .

BULLETIN OF MATHEMATICAL BIOLOGY, 1979, 41 (06) :877-891

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