Threshold dynamics of an age-space structured SIR model on heterogeneous environment

Abstract An SIR epidemic model with age-since-infection and diffusion is proposed. The next generation operator R has been explicitly calculated by a renewal process. The basic reproduction number R 0 is defined by the spectral radius of R . The system exhibits a sharp threshold dynamics in terms of R 0 .

[1]  Hal L. Smith,et al.  Monotone Dynamical Systems: An Introduction To The Theory Of Competitive And Cooperative Systems (Mathematical Surveys And Monographs) By Hal L. Smith , 1995 .

[2]  Toshikazu Kuniya,et al.  Delayed nonlocal reaction–diffusion model for hematopoietic stem cell dynamics with Dirichlet boundary conditions , 2017 .

[3]  O. Diekmann,et al.  On the definition and the computation of the basic reproduction ratio R0 in models for infectious diseases in heterogeneous populations , 1990, Journal of mathematical biology.

[4]  Xiao-Qiang Zhao,et al.  Computation of the basic reproduction numbers for reaction-diffusion epidemic models , 2023, Mathematical biosciences and engineering : MBE.

[5]  Xiao-Qiang Zhao,et al.  A non-local delayed and diffusive predator—prey model , 2001 .

[6]  Toshikazu Kuniya,et al.  An infection age-space structured SIR epidemic model with Neumann boundary condition , 2018, Applicable Analysis.

[7]  Amnon Pazy,et al.  Semigroups of Linear Operators and Applications to Partial Differential Equations , 1992, Applied Mathematical Sciences.

[8]  Xiao-Qiang Zhao,et al.  A reaction–diffusion malaria model with incubation period in the vector population , 2011, Journal of mathematical biology.

[9]  H. Amann Fixed Point Equations and Nonlinear Eigenvalue Problems in Ordered Banach Spaces , 1976 .

[10]  Xingfu Zou,et al.  Threshold dynamics of an infective disease model with a fixed latent period and non-local infections , 2011, Journal of Mathematical Biology.

[11]  Horst R. Thieme,et al.  Spectral Bound and Reproduction Number for Infinite-Dimensional Population Structure and Time Heterogeneity , 2009, SIAM J. Appl. Math..