## A Primer of EcologyA Primer of Ecology presents a concise but detailed exposition of the most common mathematical models in population and community ecology. It is intended to demystify ecological models and the mathematics behind them by deriving the models from first principles. The Primer explains in detail basic concepts of exponential and logistic population growth, age-structured demography, metapopulation dynamics, competition, predation, island biogeography, and, in a chapter new to this edition, succession. The book may be used as a self-teaching tutorial by students, as a primary textbook, or as a supplemental text to a general ecology textbook. |

### From inside the book

Results 1-3 of 12

Page 29

The population reaches a stable equilibrium (N = K) at the

curves, where birth and death rates are equal. When will the population stop

growing? As in the exponential model, the rate of population growth (dN/dt) is

zero when ...

The population reaches a stable equilibrium (N = K) at the

**intersection**of thecurves, where birth and death rates are equal. When will the population stop

growing? As in the exponential model, the rate of population growth (dN/dt) is

zero when ...

Page 208

If the curves

greater than or equal to zero, the

to the equation. The point on the x axis of the graph directly beneath the

If the curves

**intersect**in a portion of the graph where the population size isgreater than or equal to zero, the

**intersection**constitutes an equilibrium solutionto the equation. The point on the x axis of the graph directly beneath the

**intersection**...Page 210

In this case, the two curves do not

makes intuitive sense. If the population is decreasing exponentially, the

additional loss of emigrants at a constant rate will not lead to an equilibrium, and

the ...

In this case, the two curves do not

**intersect**, and there is no equilibrium.* Thismakes intuitive sense. If the population is decreasing exponentially, the

additional loss of emigrants at a constant rate will not lead to an equilibrium, and

the ...

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#### LibraryThing Review

User Review - dougb56586 - www.librarything.comThis is a very good introduction to the mathematical models used in population dynamics. The author begins with a simple exponential model of population growth, gradually extends the model to account ... Read full review

### Contents

Logistic Population Growth | 25 |

AgeStructured Population Growth | 49 |

MODEL PRESENTATION AND PREDICTIONS | 82 |

Copyright | |

13 other sections not shown

### Common terms and phrases

age class Allee effect assumptions axis birth and death birth rate calculate carrying capacity Chapter coexist cohort colonization competition constant corals death rate decrease density density-dependent depend discrete dN/dt ecology Equation 1.2 equilibrium model equilibrium point Euler equation example exponential growth exponential growth model Expression extinction rate feeding rate Figure functional response grassland habitat immigration rate instantaneous rate intersection interspecific competition iteroparous K-selection Leslie matrix logistic growth Lotka-Volterra model MacArthur-Wilson model mathematical maximum metapopulation metapopulation models number of individuals number of species offspring passive sampling model patches pioneer species plot population cycles population growth rate population sizes predator and victim predator isocline predator population prey primer propagule rate of increase red grouse represents reproductive value rescue effect semelparous simple source pool species richness species-area relationship stage vector state-space graph survivorship curve tion transition matrix turnover ulation variance victim abundance victim isocline victim population zero