Stochasticity in the parasite-driven trait evolution of competing species masks the distinctive consequences of distance metrics

Abstract

© 2017 by the author. Various distance metrics and their induced norms are employed in the quantitative modeling of evolutionary dynamics. Minimization of these distance metrics, when applied to evolutionary optimization, are hypothesized to result in different outcomes. Here, we apply the different distance metrics to the evolutionary trait dynamics brought about by the interaction between two competing species infected by parasites (exploiters). We present deterministic cases showing the distinctive selection outcomes under the Manhattan, Euclidean, and Chebyshev norms. Specifically, we show how they differ in the time of convergence to the desired optima (e.g., no disease), and in the egalitarian sharing of carrying capacity between the competing species. However, when randomness is introduced to the population dynamics of parasites and to the trait dynamics of the competing species, the distinctive characteristics of the outcomes under the three norms become indistinguishable. Our results provide theoretical cases of when evolutionary dynamics using different distance metrics exhibit similar outcomes.

Source or Periodical Title

Processes

Document Type

Article

Subject

Chebyshev norm, Egalitarianism, Euclidean norm, Evolutionary dynamics, Exploitation, Manhattan norm, Parasitism, Quantitative trait

This document is currently not available here.

Share

COinS