Analysis of Evolutionary Processes: The Adaptive Dynamics Approach and Its ApplicationsPrinceton University Press, 2008. 2. 11. - 360페이지 Quantitative approaches to evolutionary biology traditionally consider evolutionary change in isolation from an important pressure in natural selection: the demography of coevolving populations. In Analysis of Evolutionary Processes, Fabio Dercole and Sergio Rinaldi have written the first comprehensive book on Adaptive Dynamics (AD), a quantitative modeling approach that explicitly links evolutionary changes to demographic ones. The book shows how the so-called AD canonical equation can answer questions of paramount interest in biology, engineering, and the social sciences, especially economics. |
도서 본문에서
82개의 결과 중 1 - 5개
... Resident-Mutant Model The Example of Resource-Consumer Communities Does Invasion Imply Substitution? The AD Canonical Equation Evolutionary State Portraits Evolutionary Branching The Role of Bifurcation Analysis What Should We Expect ...
... mutation, the group of mutants has the potential to spread in the community and replace the resident group of similar individuals, thus leading to a small step in the evolution of the trait. Darwin first realized that those individuals ...
... models, and stochastically characterizes the occurrence of mutations. By separating the demographic and evolutionary timescales, i.e., by looking at the limit case of extremely rare and small mutations ... resident groups. However, ...
... mutations and possible external influences. In technical words, demography ... mutations and external influences) and, as such, drives the system toward a regime ... resident, as the groups of individuals bearing them. If a phenotype is ...
... resident individuals initially tend to grow in number. However, since they are few in number, they face the risk of accidental extinction and may fail to invade, i.e., to spread among the resident groups. The mutant fitness when mutants ...
목차
1 | |
Chapter 2 Modeling Approaches | 43 |
Chapter 3 The Canonical Equation of Adaptive Dynamics | 74 |
Chapter 4 Evolutionary Branching and the Origin of Diversity | 119 |
Chapter 5 Multiple Attractors and Cyclic Evolutionary Regimes | 138 |
Chapter 6 Catastrophes of Evolutionary Regimes | 153 |
Chapter 7 BranchingExtinction Evolutionary Cycles | 172 |
Chapter 8 Demographic Bistability and Evolutionary Reversals | 186 |
Chapter 10 The First Example of Evolutionary Chaos | 231 |
Appendix A Secondorder Dynamical Systems and Their Bifurcations | 243 |
Appendix B The Invasion Implies Substitution Theorem | 272 |
Appendix C The Probability of Escaping Accidental Extinction | 277 |
Appendix D The Branching Conditions | 281 |
Bibliography | 287 |
Index | 325 |
Chapter 9 SlowFast Populations Dynamics and Evolutionary Ridges | 204 |