Analysis of an Age Structured SEIRS Epidemic Model with Varying Total Population Size and Vaccination 被引量：4

Analysis of an Age Structured SEIRS Epidemic Model with Varying Total Population Size and Vaccination

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摘要 This article focuses on the study of an age structured SEIRS epidemic model with a vaccination program when the total population size is not kept at constant. We first give the explicit expression of the reproduction number in the presence of vaccine ( is the exponent of growth of total population), and show that the infection-free steady state is linearly stable if and unstable if , then we apply the theoretical results to vaccination policies to determine the optimal age or ages at which an individual should be vaccinated. It is shown that the optimal strategy can be either one- or two-age strategies. This article focuses on the study of an age structured SEIRS epidemic model with a vaccination program when the total population size is not kept at constant. We first give the explicit expression of the reproduction number in the presence of vaccine ( is the exponent of growth of total population), and show that the infection-free steady state is linearly stable if and unstable if , then we apply the theoretical results to vaccination policies to determine the optimal age or ages at which an individual should be vaccinated. It is shown that the optimal strategy can be either one- or two-age strategies.

作者 Xue-ZhiLi GeniGupur Guang-TianZhu

机构地区 DepartmentofMathematics.XinyangTeachersCollege DepartmentofMattlematics.XinjiangUniversity.Urumqi AcademyofMathematicsandSystemsScience.ChineseAcademyofSciences

出处《Acta Mathematicae Applicatae Sinica》 SCIE CSCD 2004年第1期25-36,共12页 应用数学学报（英文版）

基金 Supported by the NSFC (No.10371105) and the NSF of Henan Province (No.0312002000 No.0211044800)

关键词 age-structured SEIRS epidemic model VACCINATION varying total population size reproduction number STABILITY optimal vaccination strategies age-structured SEIRS epidemic model vaccination varying total population size reproduction number stability optimal vaccination strategies

分类号 O224 [理学—运筹学与控制论] R186 [医药卫生—流行病学]

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参考文献15

1Anderson, R.M., May, R.M. Population biology of infectious disease I, Nature, 180:361 (1979).
2Busenberg, S., Iannelli, M., Thieme, H. Dynamics of an age-structured epidemic model, in Proceedings on Dynamical Systems, Lecture Notes in Math. (Nankai Subseries) (Edited by S.T.Liao, Y.Q. Ye and T.R.Ding), World scientific, 1 19 (1993).
3Busenberg, S., Iannelli, hi.. Thieme, H. Global behavior of an age-structured epidemic model. SIAM J.Math. Anal., 22:1065-1080 (1991).
4Cha, Y., Iannelli, M., Milner, E. Existence and uniqueness of endemic states for the age-structured SIR epidemic model. Math. Biosci., 150:177-190 (1998).
5E1-Doma, M, Analysis of an age-dependent SIS epidemic model with vertical transmission and proportionatemixing assumption. Math. Comput. Model. 29:31-43 (1999).
6Green-halgh, D. Analytical threshold and stability results on age-structured epidemic models with vaccination. Theor. Popul. Biol., 33:266-290 (1988).
7Greenhalgh, D. Threshold and stability results for an epidemic model with an age-structured meeting rateIMA J. Math. Appl. Med. Biol., 5:81-100 (1988).
8Hadeler, K.P. Periodic solutions of homogeneous equations, J. Diff. Equ., 95:183-202 (1992).
9Hadeler, K.P., Muller, J. Vaccination in age-structured populations Ⅰ: The reproduction number, in Models for Infectious Human Diseases: Their Structured Relation to Data. V.Isham and G. Medley, eds.,Cambridge University Press. Cambridge, 90-101, 1993.
10Hadeler, K.P., Muller, J. Vaccination in age-structured populations Ⅱ: Optimal strategies, in Models for Infectious Human Diseases: Their Structured Relation to Data. V.Isham and G. Medley, eds. Cambridge University Press. Cambridge, 90-101,1993.

同被引文献4

1陈清江,李学志,代丽霞.带接种疫苗和二次感染的年龄结构MSEIR流行病模型分析[J].系统科学与数学,2005,25(4):385-397. 被引量：4
2谢丽红,宋岱才.一类流行病模型的后向分支——带接种疫苗的两病毒模型[J].石油化工高等学校学报,2008,21(1):96-99. 被引量：3
3苏细容,刘胜.具有年龄结构和常数迁移率的SIR模型[J].西北师范大学学报（自然科学版）,2010,46(3):6-9. 被引量：2
4Geni Gupur.Existence and Uniqueness of Endemic States for the Age-structured MSEIR Epidemic Model[J].Acta Mathematicae Applicatae Sinica,2002,18(3):441-454. 被引量：7

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1方彬,李学志.潜伏期具有传染性的年龄结构MSEIS流行病模型的稳定性[J].应用数学学报,2008,31(1):110-125. 被引量：11
2方彬,杨金根,李学志.潜伏期和染病期均具有康复的年龄结构MSEIS流行病模型的稳定性[J].应用数学,2009,22(1):90-100. 被引量：4
3王娟,周学勤,李学志.一类具有接种疫苗和再次感染的传染病模型分析[J].数学的实践与认识,2011,41(14):223-229. 被引量：4
4刘胜.一个具有年龄结构和可变迁移率的SEIR模型[J].陕西师范大学学报（自然科学版）,2018,46(1):5-9. 被引量：3

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1刘军军,闫萍,白江红.具有年龄结构的SIRS流行病模型的分析[J].石河子大学学报（自然科学版）,2011,29(1):120-124. 被引量：2
2陈冬梅,白江红,闫萍.具有年龄结构的MSEIS流行病模型稳定性分析[J].山西师范大学学报（自然科学版）,2011,25(4):7-13. 被引量：1
3俞芳,由守科,孙德荣.一类具有年龄和病程的SEIR传染病模型平衡解的存在性[J].伊犁师范学院学报（自然科学版）,2013,7(4):24-28.
4邰晓东,马万彪,郭松柏,闫海,尹春华.微生物絮凝的时滞动力学模型与理论分析[J].数学的实践与认识,2015,45(13):198-209. 被引量：4
5俞芳,由守科,孙德荣.带有病程和年龄结构的SIR传染病模型平衡解的存在性[J].伊犁师范学院学报（自然科学版）,2015,9(4):5-8.
6王娟,何俊杰,李学志.一类具有接种疫苗的年龄结构传染病模型分析[J].系统科学与数学,2015,35(11):1358-1366. 被引量：6
7辛德元.具有年龄结构的传染病模型动力学分析[J].生物技术世界,2016,13(4):325-325.
8白梦,薛亚奎.具有接种疫苗和再次感染的媒介传染病模型的稳定性分析[J].中北大学学报（自然科学版）,2016,37(2):120-125. 被引量：2
9俞芳,由守科,孙德荣.一类具有年龄和病程的SEIR传染病模型无病平衡解分析[J].数学的实践与认识,2016,46(20):165-172. 被引量：4
10秦文惠,张菊平.具有交叉感染的2种菌株对逼近模型分析[J].河北工业科技,2017,34(2):103-109. 被引量：5

1Jiancheng Zhang and Jitao Sun.A delayed SEIRS epidemic model with impulsive vaccination and nonlinear incidence rate[J].International Journal of Biomathematics,2014,7(3):149-162.
2康瑞妮,张太雷,刘俊利.A Non-autonomous SIR Epidemic Model of Prey-predator with Vaccination and Time Delay[J].Chinese Quarterly Journal of Mathematics,2015,30(3):450-461. 被引量：3
3张萍,李连兵.一类具有免疫接种年龄的传染病模型分析[J].许昌学院学报,2013,32(5):4-8.
4Lili Wang Rui Xu.Global stability of an SEIR epidemic model with vaccination[J].International Journal of Biomathematics,2016,9(6):35-57. 被引量：2
5Jianquan Li,Yali Yang.GLOBAL STABILITY OF AN SVIR EPIDEMIC MODEL WITH VACCINATION[J].Annals of Differential Equations,2011,27(2):162-168. 被引量：2
6ZHIPING WANG RUI XU.TRAVELING WAVES OF AN EPIDEMIC MODEL WITH VACCINATION[J].International Journal of Biomathematics,2013,6(5):115-133.
7Muhammad Altaf Khan,Yasir Khan,Qaiser Badshah,Saeed Islam.Global stability of SEIVR epidemic model with generalized incidence and preventive vaccination[J].International Journal of Biomathematics,2015,8(6):203-221. 被引量：1
8Junyuan Yang,Xiaoyan Wang,Fengqin Zhang.SIVS EPIDEMIC MODELS WITH INFECTION AGE AND NONLINEAR VACCINATION RATE[J].Annals of Differential Equations,2010,26(4):471-476.
9Swarnali Sharma G. P. Samanta.Stability analysis and optimal control of an epidemic model with vaccination[J].International Journal of Biomathematics,2015,8(3):45-72. 被引量：1
10李锋杰,罗桂烈,刘丙辰.PERMANENCE,PERIODIC AND ALMOST PERIODIC SOLUTIONS OF NONAUTONOMOUS STAGE STRUCTURED POPULATION DYNAMICS WITH TIME DELAY AND DIFFUSION[J].Annals of Differential Equations,2003,19(4):505-516.

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Analysis of an Age Structured SEIRS Epidemic Model with Varying Total Population Size and Vaccination 被引量：4

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