Modeling and Differential Equations in Biology
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A01=T. A. Burton
advanced population systems analysis
Alan Hastings
Author_T. A. Burton
B. S. Goh
bifurcation
Capita Consumption Rate
Category=PBW
Chris Rorres
Codling Moth
Codling Moth Control
Coexistence in Predator-Prey systems
David J. Wollkind
Discrete Time Linear Model
eq_isMigrated=1
eq_isMigrated=2
eq_nobargain
Equal Diffusion Coefficients
G. J. Butler
Georges A. Becus
Globally Asymptotically Stable
Half Saturation Constants
hopf
Howard D. Thames
immune response modeling
Jesse A. Logan
Liapunov Function
Linear Control Problem
Lotka Volterra Competition Model
Lotka Volterra Competitive System
Lotka Volterra Model
low
Low Dose Rate Continuous Irradiation
Low Zone Tolerance
mathematical ecology methods
Mathematical Models of Humoral Immune Response
Maximal Invariant Set
microbial competition theory
Models of Food Chains and Competition
Nicholas D. Alikakos
Omega Limit Set
Optimal Harvesting Policy
Ordinary Differential Equations
Paul Waltman
periodic
Periodic Solutions
point
Population Dynamics in Patchy Environments
population dynamics modeling
Population Quadrant
Positive Equilibrium
Positive Orthant
Positive Semi-definite
Positive Semidefinite
predator prey analysis
radiotherapy mathematical models
saddle
Simple Food Chains
solutions
Stephen J. Merrill
Stephen P. Hubbell
Sze-Bi Hsu
theorem
Theoretical and Experimental Investigations of Microbial Competition in Continuous Culture
Thomas G. Hallam
tolerance
Wyman Fair
zone
Product details
- ISBN 9780824771331
- Weight: 453g
- Dimensions: 210 x 280mm
- Publication Date: 01 Sep 1980
- Publisher: Taylor & Francis Inc
- Publication City/Country: US
- Product Form: Paperback
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This book describes how stability theory of differential equations is used in the modeling of microbial competition, predator-prey systems, humoral immune response, and dose and cell-cycle effects in radiotherapy, among other areas that involve population biology, and mathematical ecology.
