Heriot-Watt Mathematics Report Series
HWM99-78, 27 Apr 2000
Competition and dispersal in predator-prey waves
N J Savill and P Hogeweg
Abstract
Dispersing predators and prey can exhibit complex spatio-temporal
wave-like patterns if the interactions between them cause oscillatory
dynamics. We study the effect of these predator-prey density waves on
the competition between prey populations and between predator
populations with different dispersal strategies. We first describe 1
and 2 dimensional simulations of both discrete and continuous
predator-prey models. The results suggest that any population that
diffuses faster, disperses farther or is more likely to disperse will
exclude slower diffusing, shorter dispersing or less likely dispersing
populations, everything else being equal. It also appears that it
does not matter whether time, space or state are discrete or
continuous, nor what the exact interactions between the predators and
prey are. So long as waves exist the competition between populations
occurs in a similar fashion. We derive a theory that qualitatively
explains the observed behaviour and calculate approximate analytical
solutions that describe, to a reasonable extent, these
behaviours. Predictions about the cost of dispersal are tested. If
strong enough, cost can reverse the populations' relative competitive
strengths or lead to coexistence because of the effect of spiral wave
cores. The theory is also able to explain previous results of
simulations of coexistence if host-parasitoid models (Comins and
Hassell 1996).
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