Mathematical biology

Department of Pharmacology, University of Zurich, 8006 Zurich, Switzerland Laboratory of Mathematical Biology, National Cancer Institute, National Institutes of Health, Bethesda, MD 20892... 

Murray, J. D. (1989), Mathematical Biology, Springer-Verlag, Berlin. 

Yeh, H. C. and G. M. Schum, Models of Human Lung Airways and Their Application to Inhaled Particle Deposition, Bulletin of Mathematical Biology. 42 461-480 (1980). 

Nowak, M., Sigmund, K. and El-Sedy, E. (1995), Automata, repeated games, and noise, Journal of Mathematical Biology 33, 703-32. 

Wirme, D. (1978) The permeability coefficient of the wall of a villous membrane. Journal of Mathematical Biology, 6, 95—108. 

Brill M and West G 1981 Contributions to the theory of invariance of color under the condition of varying illumination. Journal of Mathematical Biology 11, 337-350. 

Oja E 1982 A simplified neuron model as a principal component analyzer. Journal of Mathematical Biology 15, 267-273. 

A.J. Lotka, Elements of Mathematical Biology, Dover, New York, 1956. 

Kamiya, A., Bukhari, R., and Togawa, T. (1984) Adaptive regulation of wall shear stress optimizing vascular tree function. Bulletin of Mathematical Biology 46 127-137... 

A. Marmur, W. N. Gill, E. Ruckenstein Kinetics of cell deposition under the action of an external field, BULLETIN OF MATHEMATICAL BIOLOGY 38 (1976) 713-721. 

Available at your book dealer or write for free Mathematics and Science Catalog to Dept. Cl. Dover Publications, Inc. 31 East 2nd Sl, Mineola. N.Y. 11501. Dover publishes more than 175 books each year on science, elementary and advanced mathematics, biology, music, an. literary history, social sciences and other areas. 

Weiss, M., A note on the role of generalized inverse Gaussian distributions of circulatory transit times in pharmacokinetics, Journal of Mathematical Biology, Vol. 20, 1984, pp. 95-102. 

Wise, M. and Borsboom, G., Two exceptional sets of physiological clearance curves and their mathematical form Test cases Bulletin of Mathematical Biology, Vol. 51, 1989, pp. 579-596. 

Epperson, J. and Matis, J., On the distribution of the general irreversible n-compartmental model having time-dependent transition probabilities, Bulletin of Mathematical Biology, Vol. 41, 1979, pp. 737-749. 

Agrafiotis, G., On the stochastic theory of compartments A semi-Markov approach for the analysis of the k-compartmental systems, Bulletin of Mathematical Biology, Vol. 44, No. 6, 1982, pp. 809-817. 

Weiss, M., Moments of physiological transit time distributions and the time course of drug disposition in the body, Journal of Mathematical Biology, Vol. 15, 1982, pp. 305-318. 

Durisova, M., Dedik, L., and Balan, M., Building a structured model of a complex pharmacokinetic system with time delays, Bulletin of Mathematical Biology, Vol. 57, No. 6, 1995, pp. 787-808. 

Purdue, P., Stochastic theory of compartments An open, two-compartment, reversible system with independent Poisson arrivals, Bulletin of Mathematical Biology, Vol. 37, 1975, pp. 269-275. 

Rubinow, S. and Lebowitz, J., A mathematical model of neutrophil production and control in normal man, Journal of Mathematical Biology, Vol. 1, 1975, pp. 187-225. 

Smith, W., Hypothalamic regulation of pituitary secretion of luteinizing hormone. II. Feedback control of gonadotropin secretion, Bulletin of Mathematical Biology, Vol. 42, No. 1, 1980, pp. 57-78. 

Murray Mathematical Biology I An Introduction (Third Edition)... 

While physics has built its fortunes on mathematics, biology is still an essentially empirical science, and mathematical models are mainly used for descriptive purposes, not as guiding principles. In this case, however, the problem is not that biologists are sceptical about mathematical models of epigenesis, but the fact that such models do not exist. As a matter of fact, one does exist, but nobody has taken any notice of it, which amounts to almost the same thing. 

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