Cambridge Core – Ecology and Conservation – Elements of Mathematical Ecology – by Mark Kot. pages. Dimensions: in. x in. x ts of Mathematical Ecology provides an introduction to classical and modern mathematical models. Elements of Mathematical Ecology Mark Kot. Elements of Mathematical Ecology provides an introduction to classical and modern mathematical models.
|Published (Last):||19 May 2014|
|PDF File Size:||8.19 Mb|
|ePub File Size:||11.42 Mb|
|Price:||Free* [*Free Regsitration Required]|
Princeton University Press, Princeton.
Elements of Mathematical Ecology – Mark Kot – Google Books
Global bifurcations in predatorprey models. The aim of this book was clearly to elsments a textbook for students in population ecology. Comparative methods at the species level: Help Center Find new research papers in: Journal of Difference Equations and Applications, 11, Limit cycles in a chemostat model for a single species with age structure.
American Naturalist, Elements of Mathematical Ecology. In addition, in each chapter some problems to the most important models are stated. ISBN paperback The use of mathematical models is an important issue in natural science.
Investigation of the nonlinear behavior of a partially ionized, turbulent plasma in a magnetic field. Bulletin of Mathematical Biology, 70, Account Options Sign in. Some simple nonlinear models. Skip to main content. Dispersal and pattern formation in a discrete-time predator-prey model.
Cambridge University Press Amazon. All solutions are graphically illustrated which is a major advantage of that book mathemaical for readers without a strong mathematical back- ground.
Invasion speeds in fluctuating environments. To cycle or not to cycle.
Integrodifference equations, Allee effects, and invasions. The first part of the book is devoted to simple, unstructured population models that ignore much of the variability found in natural populations for the sake Selected pages Page Bulletin of Mathematical Biology, 58, elemsnts The book consists of two parts.
The first part of the book is devoted to simple, unstructured population models that ignore much of the variability found in natural populations for the sake of tractability. Harvest models bifurcations and breakpoints.
Quantitative Methods for Ecology and The second part of this book is devoted to structured population models, covering spatially-structured population models with a focus on reaction-diffusion modelsage-structured models, and two-sex models. Bulletin of Mathematical Biology, 54, Cambridge University PressJul 19, – Mathematics – pages. Theoretical Population Biology, B44, Journal of Theoretical Biology, Speeds of invasion in a model with strong or weak Allee effects.
The modelling of the population dynamics in ecosystems e.
Part one is split into single-species models, interacting and exploited populations. Invasion and chaos in a pulsed mass-action chemostat.
Journal of Mathematical Biology, 30, Bulletin of Mathematical Biology, 77, Log In Sign Up. Elements of Mathematical Ecology. Topics covered include density dependence, bifurcations, demographic stochasticity, time delays, population interactions predation, competition, and mutualismand the application of optimal control theory to the management of renewable resources.