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Historical Bibliography Updated: March 29, 2020

Differential equations and mathematical biology.

Publication Details

London & Boston: Allen & Unwin, 1983 CE.

"This textbook shows how first-order ordinary differential equations (ODEs) are used to model the growth of a population, the administration of drugs, and the mechanism by which living cells divide. The authors present linear ODEs with constant coefficients, extend the theory to systems of equations, model biological phenomena, and offer solutions to first-order autonomous systems of nonlinear differential equations using the Poincaré phase plane. They also analyse the heartbeat, nerve impulse transmission, chemical reactions, and predator-prey problems. After covering partial differential equations and evolutionary equations, the book discusses diffusion processes, the theory of bifurcation, and chaotic behaviour. It concludes with problems of tumour growth and the spread of infectious diseases" (publisher). Second edition, with M. J. Plank, 2010.

Catalog MetadataReference Information
Entry Number#12061
Permanent Linkhttps://staging.historyofmedicine.com/entry/14270
Author Bio Linkmathshistory.st.-andrews.ac.uk ↗
External URLdifferential-equations-and-mathematical-biology

Geographic Context

Publication place: London & Boston