Abstract
Complex networks are often used to model the network of individuals for analyzing various problems in human networks e.g. information diffusion and epidemic spreading. Various epidemic spreading models are proposed for analyzing and understanding the spreading of infectious diseases in human contact networks. In the classical epidemiological model, a susceptible person becomes infected instantly after getting in contact with the infected person. However, this scenario is not realistic. In real, a healthy person become infected with some delay in time not spontaneously after contacting with the infected person. Therefore, research is needed for creating more realistic models to study the dynamics of epidemics in the human population with delay. In order to handle delays in the infection process, we propose an epidemic spreading SIR (Susceptible-Infected-Recovered) model in human contact networks as complex network. We introduce time delay parameter in infection to handle the process to become a node infected after some delay. The critical threshold is derived for epidemic spreading on large human contact network considering the delay in infection. We perform simulations on the proposed SIR model on different underlying complex network topologies, which represents the real world scenario, e.g., random geometric network with and without mobile agents. The simulation results are validated in accordance with our theoretical description which shows that increment in delay decreases the critical threshold of epidemic spreading rate and the disease persists for the longer time.
This is a preview of subscription content, log in via an institution to check access.
Access this chapter
Tax calculation will be finalised at checkout
Purchases are for personal use only
References
Sharma, R., Datta, A.: GoDisco++: a gossip algorithm for information dissemination in multi-dimensional community networks. Pervasive Mob. Comput. 9(2), 324–335 (2012)
Anderson, R.M., May, R.M., Anderson, B.: Infectious Diseases of Humans: Dynamics and Control, vol. 28. Wiley Online Library, New York (1992)
Vespignani, A.: Modelling dynamical processes in complex socio-technical systems. Nat. Phys. 8(1), 32 (2012)
Pastor-Satorras, R., Castellano, C., Van Mieghem, P., Vespignani, A.: Epidemic processes in complex networks. Rev. Mod. Phys. 87(3), 925 (2015)
Wang, J.-J., Zhang, J.-Z., Jin, Z.: Analysis of an sir model with bilinear incidence rate. Nonlinear Anal. R. World Appl. 11(4), 2390–2402 (2010)
Kermack, W.O., McKendrick, A.G.: A contribution to the mathematical theory of epidemics. In: Proceedings of the Royal Society of London A: Mathematical, Physical and Engineering Sciences, vol. 115, pp. 700–721. The Royal Society, London (1927)
Hethcote, H.W.: Qualitative analyses of communicable disease models. Math. Biosci. 28(3–4), 335–356 (1976)
Takeuchi, Y., Ma, W., Beretta, E.: Global asymptotic properties of a delay sir epidemic model with finite incubation times. Nonlinear Anal. Theory Methods Appl. 42(6), 931–947 (2000)
Moreno, Y., Pastor-Satorras, R., Vespignani, A.: Epidemic outbreaks in complex heterogeneous networks. Eur. Phys. J. B-Condens. Matter Complex Syst. 26(4), 521–529 (2002)
Erdos, P., Rényi, A.: On the evolution of random graphs. Publ. Math. Inst. Hung. Acad. Sci. 5(1), 17–60 (1960)
Penrose, M.: Random Geometric Graphs, vol. 5. Oxford University Press, Oxford (2003)
Bernoulli, D.: Essai dune nouvelle analyse de la mortalité causée par lapetite vérole et des avantages de linoculation pour la prévenir. Histoire de lAcad. Roy. Sci. (Paris) avec Mém. des Math. et Phys. and Mém 1, 1–45 (1760)
Singh, A., Singh, Y.N.: Nonlinear spread of rumor and inoculation strategies in the nodes with degree dependent tie strength in complex networks. arXiv preprint arXiv:1208.6063 (2012)
Shi, H., Duan, Z., Chen, G.: An sis model with infective medium on complex networks. Phys. A Stat. Mech. Appl. 387(8–9), 2133–2144 (2008)
Beretta, E., Takeuchi, Y.: Global stability of an sir epidemic model with time delays. J. Math. Biol. 33(3), 250–260 (1995)
Zhang, J.-Z., Wang, J.-J., Su, T.-X., Jin, Z.: Analysis of a delayed sir epidemic model. In: 2010 International Conference on Computational Aspects of Social Networks (CASoN), pp. 192–195. IEEE (2010)
Liu, L.: A delayed sir model with general nonlinear incidence rate. Adv. Differ. Equ. 2015(1), 329 (2015)
Xia, C., Wang, L., Sun, S., Wang, J.: An sir model with infection delay and propagation vector in complex networks. Nonlinear Dyn. 69(3), 927–934 (2012)
Nekovee, M., Moreno, Y., Bianconi, G., Marsili, M.: Theory of rumour spreading in complex social networks. Phys. A Stat. Mech. Appl. 374(1), 457–470 (2007)
Albert, R., Barabási, A.-L.: Statistical mechanics of complex networks. Rev. Mod. Phys. 74(1), 47 (2002)
Li, X., Wang, X.: Controlling the spreading in small-world evolving networks: stability, oscillation, and topology. IEEE Trans. Autom. Control. 51(3), 534–540 (2006)
Wang, W., Zhao, X.-Q.: An epidemic model in a patchy environment. Math. Biosci. 190(1), 97–112 (2004)
Nakata, Y.: A periodic solution of period two of a delay differential equation. arXiv preprint arXiv:1801.09244 (2018)
Bettstetter, C., Resta, G., Santi, P.: The node distribution of the random waypoint mobility model for wireless ad hoc networks. IEEE Trans. Mob. Comput. 2(3), 257–269 (2003)
Acknowledgements
This work is supported by H2020 framework project, SoBigData, grant number 654024.
Author information
Authors and Affiliations
Corresponding authors
Editor information
Editors and Affiliations
Rights and permissions
Copyright information
© 2019 Springer Nature Switzerland AG
About this paper
Cite this paper
Arquam, M., Singh, A., Sharma, R. (2019). Modelling and Analysis of Delayed SIR Model on Complex Network. In: Aiello, L., Cherifi, C., Cherifi, H., Lambiotte, R., Lió, P., Rocha, L. (eds) Complex Networks and Their Applications VII. COMPLEX NETWORKS 2018. Studies in Computational Intelligence, vol 812. Springer, Cham. https://doi.org/10.1007/978-3-030-05411-3_34
Download citation
DOI: https://doi.org/10.1007/978-3-030-05411-3_34
Published:
Publisher Name: Springer, Cham
Print ISBN: 978-3-030-05410-6
Online ISBN: 978-3-030-05411-3
eBook Packages: Intelligent Technologies and RoboticsIntelligent Technologies and Robotics (R0)