Dinâmica de Propagação de Vírus: Transmissibilidade, Virulência e Mecanismos de Controle

Authors

  • H.M. YANG

DOI:

https://doi.org/10.5540/tema.2002.03.01.0223

Abstract

Muitas infecções que ainda assolam a humanidade podem ser combatidas usando-se as vacinações em massa. O acúmulo de conhecimentos referentes à transmissão de infecções permitiu quantificar a sua dinâmica usando-se modelos matemáticos. Estes modelos, no entanto, não apenas descrevem a disseminação das doenças na comunidade, mas também podem ser preditivos quanto aos resultados de diferentes mecanismos de controle que são introduzidos nesta comunidade.

References

[1] R.M. Anderson and R.M. May, “Infectious Diseases of Humans – Dynamics and Control”, Oxford University Press, Oxford, New York, 1992.

J.J. Angulo, Varíola, em “Doenças Infecciosas e Parasitárias” (R. Veronezi, ed.), pp. 55-63, Ed. Guanabara Koogan S.A., Rio de Janeiro, 1991.

M.B.F. Leite, R.C. Bassanezi e H.M. Yang, The basic reproduction ratio for a model of directly transmitted infections considering the virus charge and the immunological response, IMA J. Math. Appl. Med. Biol., 17 (2000), 15-31.

M.Z. Rouquayrol e N. Almeida, “Epidemiologia & Saúde”, Ed. Médica e Cient. Ltda., Rio de Janeiro, 1999.

H.M. Yang, “Epidemiologia Matemática – Estudo dos Efeitos da Vacinação em Doenças de Transmissão Direta”, Edunicamp e Fapesp, Campinas e São Paulo, 2001.

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Published

2002-06-01

How to Cite

YANG, H. (2002). Dinâmica de Propagação de Vírus: Transmissibilidade, Virulência e Mecanismos de Controle. Trends in Computational and Applied Mathematics, 3(1), 223–232. https://doi.org/10.5540/tema.2002.03.01.0223

Issue

Vol. 3 No. 1 (2002)

Section

Original Article

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