DYNAMICS FOR AN SIR EPIDEMIC MODEL WITH NONLOCAL DIFFUSION AND FREE BOUNDARIES

doi:10.1007/s10473-021-0404-x

数学物理学报(英文版) ›› 2021, Vol. 41 ›› Issue (4): 1081-1106.doi: 10.1007/s10473-021-0404-x

DYNAMICS FOR AN SIR EPIDEMIC MODEL WITH NONLOCAL DIFFUSION AND FREE BOUNDARIES

赵孟¹, 李万同², 曹佳峰³

1. College of Mathematics and Statistics, Northwest Normal University, Lanzhou 730070, China School of Mathematics and Statistics, Lanzhou University, Lanzhou 730000, China;
2. School of Mathematics and Statistics, Lanzhou University, Lanzhou 730000, China;
3. Department of Applied Mathematics, Lanzhou University of Technology, Lanzhou 730050, China

收稿日期:2020-04-04 修回日期:2020-07-01 出版日期:2021-08-25 发布日期:2021-09-01
通讯作者: Wantong LI E-mail:wtli@lzu.edu.cn
作者简介:Meng ZHAO,E-mail:zhaom@nwnu.edu.cn;Wantong LI,E-mail:wtli@lzu.edu.cn;Jiafeng CAO,E-mail:caojf07@lzu.edu.cn
基金资助:
Zhao was supported by a scholarship from the China Scholarship Council, Li was partially supported by NSF of China (11731005), and Cao was partially supported by NSF of China (11901264).

DYNAMICS FOR AN SIR EPIDEMIC MODEL WITH NONLOCAL DIFFUSION AND FREE BOUNDARIES

Meng ZHAO¹, Wantong LI², Jiafeng CAO³

1. College of Mathematics and Statistics, Northwest Normal University, Lanzhou 730070, China School of Mathematics and Statistics, Lanzhou University, Lanzhou 730000, China;
2. School of Mathematics and Statistics, Lanzhou University, Lanzhou 730000, China;
3. Department of Applied Mathematics, Lanzhou University of Technology, Lanzhou 730050, China

Received:2020-04-04 Revised:2020-07-01 Online:2021-08-25 Published:2021-09-01
Contact: Wantong LI E-mail:wtli@lzu.edu.cn
Supported by:
Zhao was supported by a scholarship from the China Scholarship Council, Li was partially supported by NSF of China (11731005), and Cao was partially supported by NSF of China (11901264).

摘要/Abstract

摘要： This paper is concerned with the spatial propagation of an SIR epidemic model with nonlocal diffusion and free boundaries describing the evolution of a disease. This model can be viewed as a nonlocal version of the free boundary problem studied by Kim et al. (An SIR epidemic model with free boundary. Nonlinear Anal RWA, 2013, 14:1992-2001). We first prove that this problem has a unique solution defined for all time, and then we give sufficient conditions for the disease vanishing and spreading. Our result shows that the disease will not spread if the basic reproduction number $R_0<1$, or the initial infected area $h_0$, expanding ability $\mu$, and the initial datum $S_0$ are all small enough when $1 < R_0 < 1+\frac{d}{\mu_2+\alpha}$. Furthermore, we show that if $1 < R_0 < 1+\frac{d}{\mu_2+\alpha}$, the disease will spread when $h_0$ is large enough or $h_0$ is small but $\mu$ is large enough. It is expected that the disease will always spread when $R_0\geq1+\frac{d}{\mu_2+\alpha}$, which is different from the local model.

关键词: SIR model, nonlocal diffusion, free boundary, spreading and vanishing

Abstract: This paper is concerned with the spatial propagation of an SIR epidemic model with nonlocal diffusion and free boundaries describing the evolution of a disease. This model can be viewed as a nonlocal version of the free boundary problem studied by Kim et al. (An SIR epidemic model with free boundary. Nonlinear Anal RWA, 2013, 14:1992-2001). We first prove that this problem has a unique solution defined for all time, and then we give sufficient conditions for the disease vanishing and spreading. Our result shows that the disease will not spread if the basic reproduction number $R_0<1$, or the initial infected area $h_0$, expanding ability $\mu$, and the initial datum $S_0$ are all small enough when $1 < R_0 < 1+\frac{d}{\mu_2+\alpha}$. Furthermore, we show that if $1 < R_0 < 1+\frac{d}{\mu_2+\alpha}$, the disease will spread when $h_0$ is large enough or $h_0$ is small but $\mu$ is large enough. It is expected that the disease will always spread when $R_0\geq1+\frac{d}{\mu_2+\alpha}$, which is different from the local model.

Key words: SIR model, nonlocal diffusion, free boundary, spreading and vanishing

中图分类号:

35K57

赵孟, 李万同, 曹佳峰. DYNAMICS FOR AN SIR EPIDEMIC MODEL WITH NONLOCAL DIFFUSION AND FREE BOUNDARIES[J]. 数学物理学报(英文版), 2021, 41(4): 1081-1106.

Meng ZHAO, Wantong LI, Jiafeng CAO. DYNAMICS FOR AN SIR EPIDEMIC MODEL WITH NONLOCAL DIFFUSION AND FREE BOUNDARIES[J]. Acta mathematica scientia,Series B, 2021, 41(4): 1081-1106.

参考文献

[1] Andreu-Vaillo F, Mazón J M, Rossi J D, et al. Nonlocal Diffusion Problems, Mathematical Surveys and Monographs, AMS, Providence, Rhode Island, 2010
[2] Bunting G, Du Y, Krakowski K. Spreading speed revisited:analysis of a free boundary model. Netw Heterog Media, 2012, 7:583-603
[3] Cao J F, Du Y, Li F, et al. The dynamics of a nonlocal diffusion model with free boundary. J Funct Anal, 2019, 277:2772-2814
[4] Cao J F, Li W T, Wang J, et al. The dynamics of a Lotka-Volterra competition model with nonlocal diffusion and free boundaries. Adv Difference Equ, 2021, 26:163-200
[5] Du Y, Li F, Zhou M. Semi-wave and spreading speed of the nonlocal Fisher-KPP equation with free boundaries. arXiv:1909.03711
[6] Du Y, Lin Z. Spreading-vanishing dichotomy in the diffusive logistic model with a free boundary. SIAM J Math Anal, 2010, 42:377-405; Erratum:SIAM J Math Anal, 2013, 45:1995-1996
[7] Du Y, Lin Z. The diffusive competition model with a free boundary:invasion of a superior or inferior competitor. Discrete Contin Dyn Syst Ser B, 2014, 19:3105-3132
[8] Du Y, Lou B. Spreading and vanishing in nonlinear diffusion problems with free boundaries. J Eur Math Soc, 2015, 17:2673-2724
[9] Du Y, Wang M, Zhao M. Two species nonlocal diffusion systems with free boundaries. arXiv:1907.04542
[10] Du Y, Wang M, Zhou M. Semi-wave and spreading speed for the diffusive competition model with a free boundary. J Math Pures Appl, 2017, 107:253-287
[11] Du Y, Wei L, Zhou L. Spreading in a shifting environment modeled by the diffusive logistic equation with a free boundary. J Dynam Differential Equations, 2018, 30:1389-1426
[12] Ge J, Kim K I, Lin Z, et al. A SIS reaction-diffusion-advection model in a low-risk and high-risk domain. J Differential Equations, 2015, 259:5486-5509
[13] Gu H, Lou B, Zhou M. Long time behavior of solutions of Fisher-KPP equation with advection and free boundaries. J Funct Anal, 2015, 269:1714-1768
[14] Guo J, Wu C. On a free boundary problem for a two-species weak competition system. J Dynam Differential Equations, 2012, 24:873-895
[15] Hethcote H W. Qualitative analyses of communicable disease models. Math Biosci, 1976, 28:335-356
[16] Hosono Y, Ilyas B. Travelling waves for a simple diffusive epidemic model. Math Model Meth Appl Sci, 1994, 5:935-966
[17] Huang H, Wang M. The reaction-diffusion system for an SIR epidemic model with a free boundary. Discrete Contin Dyn Syst Ser B, 2015, 20:2039-2050
[18] Kaneko Y, Matsuzawa M. Spreading and vanishing in a free boundary problem for nonlinear diffusion equations with a given forced moving boundary. J Differential Equations, 2018, 265:1000-1043
[19] Kawai Y, Yamada Y. Multiple spreading phenomena for a free boundary problem of a reaction-diffusion equation with a certain class of bistable nonlinearity. J Differential Equations, 2016, 261:538-572
[20] Kim K I, Lin Z, Zhang Q. An SIR epidemic model with free boundary. Nonlinear Anal Real World Appl, 2013, 14:1992-2001
[21] Kuniya T, Wang J. Lyapunov functions and global stability for a spatially diffusive SIR epidemic model. Appl Anal, 2017, 96:1935-1960
[22] Li F, Liang X, Shen W. Diffusive KPP equations with free boundaries in time almost periodic environments:II. Spreading speeds and semi-wave solutions. J Differential Equations, 2016, 261:2403-2445
[23] Li L, Wang J, Wang M. The dynamics of nonlocal diffusion systems with different free boundaries. Commun Pure Appl Anal, 2020, 19:3651-3672
[24] Li L, Sheng W, Wang M. Systems with nonlocal vs. local diffusions and free boundaries. J Math Anal Appl, 2020, 483:123646
[25] Li W T, Sun Y J, Wang Z C. Entire solutions in the Fisher-KPP equation with nonlocal dispersal. Nonlinear Anal Real World Appl, 2010, 11:2302-2313
[26] Liang X. Semi-wave solutions of KPP-Fisher equations with free boundaries in spatially almost periodic media. J Math Pures Appl, 2019, 127:299-308
[27] Lin Z, Zhu H. Spatial spreading model and dynamics of West Nile virus in birds and mosquitoes with free boundary. J Math Biol, 2017, 75:1381-1409
[28] Liu S, Huang H, Wang M. A free boundary problem for a prey-predator model with degenerate diffusion and predator-stage structure. Discrete Contin Dyn Syst Ser B, 2020, 25:1649-1670
[29] Liu S, Wang M. Existence and uniqueness of solution of free boundary problem with partially degenerate diffusion. Nonlinear Anal Real World Appl, 2020, 54:103097
[30] Wang J, Wang M. Free boundary problems with nonlocal and local diffusions I:Global solution. J Math Anal Appl, 2020, 490:123974
[31] Wang J, Wang M. Free boundary problems with nonlocal and local diffusions II:Spreading-vanishing and long-time behavior. Discrete Contin Dyn Syst Ser B, 2020, 25:4721-4736
[32] Wang M. On some free boundary problems of the prey-predator model. J Differential Equations, 2014, 256:3365-3394
[33] Wang M, Zhao J. Free boundary problems for a Lotka-Volterra competition system. J Dynam Differential Equations, 2014, 26:655-672
[34] Wang M, Zhao J. A free boundary problem for the predator-prey model with double free boundaries. J Dynam Differential Equations, 2017, 29:957-979
[35] Wang M, Zhang Y. Dynamics for a diffusive prey-predator model with different free boundaries. J Differential Equations, 2018, 264:3527-3558
[36] Zhao M, Zhang Y, Li W T, et al. The dynamics of a man-environment-man epidemic model with nonlocal diffusion and free boundaries. J Differential Equations, 2020, 269:3347-3386

DYNAMICS FOR AN SIR EPIDEMIC MODEL WITH NONLOCAL DIFFUSION AND FREE BOUNDARIES

DYNAMICS FOR AN SIR EPIDEMIC MODEL WITH NONLOCAL DIFFUSION AND FREE BOUNDARIES

PDF (PC)

摘要/Abstract

引用本文

使用本文

参考文献

相关文章 15

Metrics

本文评价

推荐阅读 10

[1]	王晓燕, 杨俊元. DYNAMICS OF A NONLOCAL DISPERSAL FOOT-AND-MOUTH DISEASE MODEL IN A SPATIALLY HETEROGENEOUS ENVIRONMENT[J]. 数学物理学报(英文版), 2021, 41(2): 552-572.
[2]	Nermina MUJAKOVIC, Nelida CRNJARIC-ZIC. GLOBAL SOLUTION TO 1D MODEL OF A COMPRESSIBLE VISCOUS MICROPOLAR HEAT-CONDUCTING FLUID WITH A FREE BOUNDARY[J]. 数学物理学报(英文版), 2016, 36(6): 1541-1576.
[3]	陈化, 吕文斌, 吴少华. SOLVABILITY OF A PARABOLIC-HYPERBOLIC TYPE CHEMOTAXIS SYSTEM IN 1-DIMENSIONAL DOMAIN[J]. 数学物理学报(英文版), 2016, 36(5): 1285-1304.
[4]	孔慧慧, 李海梁, 张兴伟. A BLOW-UP CRITERION OF SPHERICALLY SYMMETRIC STRONG SOLUTIONS TO 3D COMPRESSIBLE NAVIER-STOKES EQUATIONS WITH FREE BOUNDARY[J]. 数学物理学报(英文版), 2016, 36(4): 1153-1166.
[5]	秦晓红, 王腾, 王益. GLOBAL STABILITY OF WAVE PATTERNS FOR COMPRESSIBLE NAVIER-STOKES SYSTEM WITH FREE BOUNDARY[J]. 数学物理学报(英文版), 2016, 36(4): 1192-1214.
[6]	连汝续, 刘健. FREE BOUNDARY VALUE PROBLEM FOR THE CYLINDRICALLY SYMMETRIC COMPRESSIBLE NAVIER-STOKES EQUATIONS WITH DENSITY-DEPENDENT VISCOSITY[J]. 数学物理学报(英文版), 2016, 36(1): 111-123.
[7]	王丽. THE PROBLEM FOR THE SUPERSONIC PLANE FLOW PAST A CURVED WEDGE[J]. 数学物理学报(英文版), 2015, 35(3): 681-689.
[8]	Helmer A. FRIIS, Steinar EVJE. WELL-POSEDNESS OF A COMPRESSIBLE GAS-LIQUID MODEL FOR DEEPWATER OIL WELL OPERATIONS[J]. 数学物理学报(英文版), 2014, 34(1): 107-124.
[9]	刘健. LOCAL EXISTENCE OF SOLUTION TO FREE BOUNDARY VALUE PROBLEM FOR COMPRESSIBLE NAVIER-STOKES EQUATIONS[J]. 数学物理学报(英文版), 2012, 32(4): 1298-1320.
[10]	Hakho Hong, Feimin Huang. ASYMPTOTIC BEHAVIOR OF SOLUTIONS TOWARD THE SUPERPOSITION OF CONTACT DISCONTINUITY AND SHOCK WAVE FOR COMPRESSIBLE NAVIER-STOKES EQUATIONS WITH FREE BOUNDARY[J]. 数学物理学报(英文版), 2012, 32(1): 389-412.
[11]	王振, 张卉. FREE BOUNDARY VALUE PROBLEM OF ONE DIMENSIONAL TWO-PHASE LIQUID-GAS MODEL[J]. 数学物理学报(英文版), 2012, 32(1): 413-432.
[12]	杨舟. THE REGULARITY OF THE FREE BOUNDARY FOR \|STRIKE RESET OPTION[J]. 数学物理学报(英文版), 2010, 30(5): 1721-1729.
[13]	蓝国烈, 马志明, 孙苏勇. ON THE BASIC REPRODUCTION NUMBER OF GENERAL BRANCHING PROCESSES[J]. 数学物理学报(英文版), 2009, 29(4): 1081-1094.
[14]	袁光伟. REGULARITY OF THE FREE BOUNDARY IN ELECTROCHEMICAL MACHINING PROBLEM[J]. 数学物理学报(英文版), 1995, 15(3): 247-253.
[15]	王俊禹, 郑大伟, 王学孔. A SINGULAR OR NONSINGULAR PERTURBATION PROBLEM FOR A SECOND ORDER NONLINEAR DIFFERENTIAL EQUATION WITH TWO FREE ENDPOINTS[J]. 数学物理学报(英文版), 1995, 15(1): 39-47.