Emergence of ratio-dependent and predator-dependent functional responses for pollination mutualism and seed parasitism
Authored by Donald L DeAngelis, JN Holland
Date Published: 2006
DOI: 10.1016/j.ecolmodel.2005.06.005
Sponsors:
United States Geological Survey (USGS)
Platforms:
No platforms listed
Model Documentation:
Other Narrative
Mathematical description
Model Code URLs:
Model code not found
Abstract
Prey (N) dependence {[}g(N)], predator (P) dependence {[}g(P) or
g(N,P)], and ratio dependence {[}f(P/N)] are often seen as contrasting
forms of the predator's functional response describing predator
consumption rates on prey resources in predator-prey and parasitoid-host
interactions. Analogously, prey-, predator-, and ratio-dependent
functional responses are apparently alternative functional responses for
other types of consumer-resource interactions. These include, for
example, the fraction of flowers pollinated or seeds parasitized in
pollination (pre-dispersal) seed-parasitism mutualisms, such as those
between fig wasps and fig trees or yucca moths and yucca plants. Here we
examine the appropriate functional responses for how the fraction of
flowers pollinated and seeds parasitized vary with the density of
pollinators (predator dependence) or the ratio of pollinator and flower
densities (ratio dependence). We show that both types of functional
responses can emerge from minor, but biologically important variations
on a single model. An individual-based model was first used to describe
plant-pollinator interactions. Conditional upon on whether the number of
flowers visited by the pollinator was limited by factors other than
search time (e.g., by the number of eggs it had to lay, if it was also a
seed parasite), and on whether the pollinator could directly find
flowers on a plant, or had to search, the simulation results lead to
either a predator-dependent or a ratio-dependent functional response. An
analytic model was then used to show mathematically how these two cases
can arise. (c) 2005 Published by Elsevier B.V.
Tags
models
Prey theory