Analysis of a Diffusive Heroin Epidemic Model in a Heterogeneous Environment
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[1] Jinliang Wang,et al. Threshold dynamics of a vector-borne disease model with spatial structure and vector-bias , 2020, Appl. Math. Lett..
[2] Wei Wang,et al. Coevolution spreading in complex networks , 2019, Physics Reports.
[3] Xingfu Zou,et al. Asymptotic profiles of steady states for a diffusive SIS epidemic model with mass action infection mechanism , 2016 .
[4] Gang Huang,et al. A note on global stability for a heroin epidemic model with distributed delay , 2013, Appl. Math. Lett..
[5] Bin Fang,et al. Global asymptotic properties of a heroin epidemic model with treat-age , 2015, Appl. Math. Comput..
[6] Lidia A. Braunstein,et al. Containing misinformation spreading in temporal social networks , 2019, Chaos.
[7] Wei Wang,et al. Critical phenomena of information spreading dynamics on networks with cliques , 2018, Physical Review E.
[8] Xiao-Qiang Zhao,et al. Robust persistence for semidynamical systems , 2001 .
[9] Hal L. Smith,et al. Abstract functional-differential equations and reaction-diffusion systems , 1990 .
[10] Xiao-Qiang Zhao,et al. Computation of the basic reproduction numbers for reaction-diffusion epidemic models , 2023, Mathematical biosciences and engineering : MBE.
[11] Xue-Zhi Li,et al. Global stability for a heroin model with two distributed delays , 2014 .
[12] Xiao-Qiang Zhao,et al. A reaction–diffusion malaria model with incubation period in the vector population , 2011, Journal of mathematical biology.
[13] E. White,et al. Heroin epidemics, treatment and ODE modelling. , 2007, Mathematical biosciences.
[14] Tailei Zhang,et al. Global behaviour of a heroin epidemic model with distributed delays , 2011, Appl. Math. Lett..
[15] Xingfu Zou,et al. Dynamics and profiles of a diffusive host–pathogen system with distinct dispersal rates , 2018 .
[16] Fengqin Zhang,et al. Global dynamics of a heroin epidemic model with age structure and nonlinear incidence , 2016 .
[17] Rui Peng,et al. Asymptotic profile of the positive steady state for an SIS epidemic reaction–diffusion model: Effects of epidemic risk and population movement , 2013 .
[18] Sanyang Liu,et al. Bifurcation of a heroin model with nonlinear incidence rate , 2017 .
[19] Yongli Cai,et al. Spatiotemporal transmission dynamics for influenza disease in a heterogenous environment , 2019, Nonlinear Analysis: Real World Applications.
[20] G. P. Samanta,et al. Dynamic behaviour for a nonautonomous heroin epidemic model with time delay , 2011 .
[21] Jinliang Wang,et al. Analysis of a reaction-diffusion host-pathogen model with horizontal transmission , 2020 .
[22] Yuan Lou,et al. Asymptotic profiles of the steady states for an SIS epidemic reaction-diffusion model , 2008 .
[23] 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.
[24] Ming Tang,et al. Social contagions with communication channels alternation on multiplex networks , 2017, Physical Review E.
[25] P. C. Dunne,et al. A semilinear parabolic system arising in the theory of superconductivity , 1981 .
[26] Jinliang Wang,et al. Analysis of a Reaction–Diffusion Cholera Model with Distinct Dispersal Rates in the Human Population , 2020 .
[27] Rui Peng,et al. Asymptotic profiles of the positive steady state for an SIS epidemic reaction-diffusion model. Part I , 2009 .
[28] Salih Djilali,et al. A Heroin Epidemic Model: Very General Non Linear Incidence, Treat-Age, and Global Stability , 2017 .
[29] Xianning Liu,et al. Mathematical Analysis for an Age-Structured Heroin Epidemic Model , 2019, Acta Applicandae Mathematicae.
[30] Horst R. Thieme,et al. Spectral Bound and Reproduction Number for Infinite-Dimensional Population Structure and Time Heterogeneity , 2009, SIAM J. Appl. Math..
[31] Xianning Liu,et al. A reaction–diffusion within-host HIV model with cell-to-cell transmission , 2018, Journal of Mathematical Biology.
[32] Xiao-Qiang Zhao,et al. Global Attractors and Steady States for Uniformly Persistent Dynamical Systems , 2005, SIAM J. Math. Anal..
[33] Brian Straughan,et al. A note on heroin epidemics. , 2009, Mathematical biosciences.
[34] Jinliang Wang,et al. Analysis of a reaction-diffusion cholera epidemic model in a spatially heterogeneous environment , 2020, Commun. Nonlinear Sci. Numer. Simul..
[35] Jinliang Wang,et al. Threshold dynamics of a delayed nonlocal reaction-diffusion HIV infection model with both cell-free and cell-to-cell transmissions , 2020 .