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A discrete-time epidemiological model to quantify selection for disease resistance

Published online by Cambridge University Press:  18 August 2016

K. MacKenzie  and
S. C. Bishop
K. MacKenzie
Affiliation:
Roślin Institute (Edinburgh), Roślin, Midlothian EH25 9PS
S. C. Bishop
Affiliation:
Roślin Institute (Edinburgh), Roślin, Midlothian EH25 9PS
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Abstract

A genetic epidemiological model (GEM) for investigating the effect of selection for disease resistance on the epidemiology of infectious diseases is presented and applied to a pig breeding scenario. Fundamental to the model is R0, the basic reproductive ratio. R0 is the expected number of secondary infections caused by a single infection. If R0 is greater than 1, there will be an epidemic. The aim of the model is to quantify the effect of selection on R0 and the consequences this has on disease epidemiology. Two implementations are presented: selection for reduced susceptibility/infectivity to a disease and introgression of a major resistance gene. The results suggest that the effects of selection for reduced susceptibility I infectivity are critically dependent on the infectiousness of the disease. Under the assumptions made in the model, for a disease with a low infection level, it takes approximately 15 years of selection until R0 is less than 1 and the population is safe from epidemics should the infectious agent be present. For a highly infectious disease, this time may be as long as 100 years. For gene introgression, the population is expected to be free from epidemics within 5 years and the time to reduce R0 to less than 1 is largely independent of the disease being considered. With gene introgression, the proportion of the population which needs to be resistant to ensure that R0 is less than one is shown to be a function of the initial R0 for the disease. Although selection, as modelled, results in a linear decline in R0, the reduction in the proportion of animals infected during an epidemic is non-linear. The selection process reduces the amount of infectious material that is in the environment when an infection occurs and this decreases the force of infection on unselected animals. This phenomenon results in a marked interaction between host genotype and disease epidemiology. Thus, the results of the model show that altering the genetics of individual animals affects the epidemiology of the disease at the population level. The model can be applied to any farm structure and any microparasitic infectious disease.

Keywords

disease resistanceepidemiologygeneticspigsR0
Type
Research Article
Information
Animal Science , Volume 69 , Issue 3 , December 1999 , pp. 543 - 551
Copyright
Copyright © British Society of Animal Science 1999

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References

Afraz, F., Yamamoto, Y. and Okada, I., 1994. ?Divergent selection for delayed-type wattle reaction of domestic fowls to BCG antigen. British Poultry Science 35: 4758.CrossRefGoogle ScholarPubMed
Anderson, R. M. and May, R. M. 1992. Infectious diseases of humans . Dynamics and control. Oxford University Press, Oxford.Google Scholar
Barger, I. A. 1989. Genetic resistance of hosts and its influence on epidemiology. Veterinary Parasitology 32: 2135.Google Scholar
Bishop, S. C., Bairden, K., McKellar, Q. A., Park, M. and Stear, M. J. 1996. Genetic parameters for faecal egg count following mixed, natural, predominantly Ostertagia circumcincta infection and relationships with live weight in young lambs. Animal Science 63: 423428.CrossRefGoogle Scholar
Bishop, S. C. and Stear, M. J. 1997. Modelling responses to selection for resistance to gastro-intestinal parasites in sheep. Animal Science 64: 469478.Google Scholar
Bouma, A., Jong, M. C. M. de and Kimman, T. G. 1997. Transmission of pseudorabies virus within pig populations is independent of the size of the population. Preventive Veterinary Medicine 23: 163172.Google Scholar
Bumstead, N. and Barrow, P. A. 1988. Genetics of resistance to Salmonella typhimurium in newly hatched chicks. British Poultry Sciences: 521529.CrossRefGoogle ScholarPubMed
Diekmann, O., Heesterbeek, J. A. P. and Metz, J. A. J. 1990. On the definition and the computation of the basic reproduction ratio R0 in models for infectious diseases in heterogeneous populations. Journal of Mathematical Biology 28: 365382.Google Scholar
Eady, S. J., Dobson, R. J. and Barnes, E. H. 1997. Impact of improved host resistance on worm control in Merinos - a computer simulation study. Proceedings of the fourth international congress of sheep veterinarians, pp. 341345.Google Scholar
Edfors-Lilja, I., Gustafsson, U., Duval-Iflah, Y., Ellergren, H., Johansson, M., Juneja, R. K., Marklund, L. and Andersson, L. 1995. The porcine intestinal receptor for Escherichia coli K88ab, K88ac: regional localization on chromosome 13 and influence of IgG response to the K88 antigen. Animal Genetics 26: 237242.Google Scholar
Edfors-Lilja, I., Petersson, H. and Gahne, B. 1986. Performance of pigs with or without the intestinal receptor for Escherichia coli K88. Animal Production 42: 381387.Google Scholar
Falconer, D. S. and Mackay, T. F. C. 1996. Introduction to quantitative genetics, fourth edition. Longman Group Ltd, London.Google Scholar
Grenfell, B. T. and Smith, G. 1990. Mathematical model for the impact of a pseudorabies epizootic on the productivity of a farrow-to-finish operation. American Journal of Veterinary Research 51: 156164.CrossRefGoogle ScholarPubMed
Hone, J. 1994. A mathematical model of detection and dynamics of porcine transmissible gastroenteritis. Epidemiology and Infection 113: 187197.Google Scholar
Hu, Z. L., Hasler-Rapacz, J., Huang, S. C. and Rapacz, J. 1993 Studies in swine on inheritance and variation in expression of small intestinal receptors mediating adhesion of the K88 enteropathogenic Escherichia coli variants. Journal of Heredity 84: 157165.Google Scholar
Jong, M. C. M. de, Diekmann, O. and Heesterbeek, J. A. P. 1994. The computation of R0 for discrete-time epidemic models with dynamic heterogeneity. Mathematical Biosciences 119: 97114.Google Scholar
Mallard, B. A., Wilkie, B. N., Kennedy, B. W., Gibson, J. and Quinton, M. 1998. Immune responsiveness in swine: eight generations of selection for high and low immune response in Yorkshire pigs. Proceedings of the sixth world congress on genetics applied to livestock production, Annidale, vol. 27, pp. 257264.Google Scholar
Morris, C. A. 1998. Responses to selection for disease resistance in sheep and cattle in New Zealand and Australia. Proceedings of the sixth world congress on genetics applied to livestock production, Armidale, vol. 27, pp. 295302.Google Scholar
Roberts, M. G. and Heesterbeek, J. A. P. 1995. The dynamics of nematode infections of farmed ruminants. Parasitology 110: 493502.Google Scholar
Sacco, R. E., Nestor, K. E., Saif, Y. M., Tsai, H. J., Anthony, N. B. and Patterson, R. A. 1994. Genetic analysis of antibody responses of turkeys to Newcastle disease virus and Pasteurella multocida vaccines. Poultry Science 73: 11691174.Google Scholar
Sellwood, R. 1979. Escherichia coli diarrhoea in pigs with or without the K88 receptor. Veterinary Record 105: 228230.Google Scholar
Stringer, S. M., Hunter, N. and Woolhouse, M.E.J. 1998. A mathematical model of the dynamics of scrapie in a sheep flock. Mathematical Biosciences 153: 7998.CrossRefGoogle Scholar
Windon, R. G. 1990. Selective breeding for the control of nematodiasis in sheep. Revue Scientifique et Technique — Office International des Épizooties 9: 555576.CrossRefGoogle ScholarPubMed