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Issue		M2AN Volume 37, Number 4, July-August 2003 Biological and Biomedical Applications
Page(s)		709 - 723
DOI		10.1051/m2an:2003045

References

1. N. Bellomo and L. Preziosi, Modeling and mathematical problems related to tumors immune system interactions. Math. Comput. Model. 31 (2000) 413-452.
2. R. Bürger,The mathematical theory of selection, recombination and mutation. Wiley (2000).
3. M.A.J. Chaplain Ed., Special Issue on Mathematical Models for the Growth, Development and Treatment of Tumours. Math. Mod. Meth. Appl. S. 9 (1999).
4. E. De Angelis and P.-E. Jabin, Analysis of a mean field modelling of tumor and immune system competition. Math. Mod. Meth. Appl. S. 13 (2003) 187-206.
5. P. Degond and B. Lucquin-Desreux, The Fokker-Plansk asymptotics of the Boltzmann collision operator in the Coulomb case? Math. Mod. Meth. Appl. S. 2 (1992) 167-182.
6. O. Dieckmann and J.P. Heesterbeek, Mathematical Epidemiology of infectious Diseases. Wiley, New York (2000).
7. O. Diekmann, P.-E. Jabin, S. Mischler and B. Perthame, Adaptive dynamics without time scale separation. Work in preparation.
8. A. Lins, W. de Melo and C.C. Pugh, On Liénard's equation. Lecture Notes in Math. 597 (1977) 334-357.
9. R.M. May and M.A. Nowak, Virus dynamics (mathematical principles of immunology and virology). Oxford Univ. Press (2000).
10. A.S. Perelson and G. Weisbuch, Immunology for physicists. Rev. modern phys. 69 (1997) 1219-1267.
11. J. Salda na, S.F. Elana and R.V. Solé, Coinfection and superinfection in RNA virus populations: a selection-mutation model. Math. Biosci. 183 (2003) 135-160.
12. C.H. Taubes, Modeling lectures on differential equations in biology. Prentice-Hall (2001).
13. C. Villani, A review of mathematical topics in collisional kinetic theory, in Handbook of fluid mechanics, S. Friedlander and D. Serre Eds., Vol. 1. North-Holland, Amsterdam (2000) 71-305.
14. D. Waxman, A model of population genetics and its mathematical relation to quantum theory. Contemp. phys. 43 (2002) 13-20.

Abstract

What is OpenURL?

The OpenURL standard is a protocol for transmission of metadata describing the resource that you wish to access. An OpenURL link containsarticle metadata and directs it to the OpenURL server of your choice. The OpenURL server can provide access to the resource and also offer complementary services (specific search engine, export of references...). The OpenURL link can be generated by different means:

• if your librarian has set up your subscription with an OpenURL resolver, OpenURL links appear automatically on the abstract pages,
• you can define your own OpenURL resolver with your EDPS Account. In this case your choice will be given priority over that of your library,
• you can use an add-on for your browser (Firefox or I.E.) to display OpenURL links on a page (see http://www.openly.com/openurlref/). You should disable this module if you wish to use the OpenURL server that you or your library have defined.

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