A simple rule for the evolution of fast dispersal at the edge of expanding populations
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First author draft
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DOI
Authors
Deforet, Maxime
Carmona-Fontaine, Carlos
Korolev, Kirill S.
Xavier, Joao B.
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First author draft
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Citation
Maxime Deforet, Carlos Carmona-Fontaine, Kirill S Korolev, Joao B Xavier. "A simple rule for the evolution of fast dispersal at the edge of expanding populations."
Abstract
Evolution by natural selection is commonly perceived as a process that favors those that replicate faster to leave more offspring; nature, however, seem to abound with examples where organisms forgo some replicative potential to disperse faster. When does selection favor invasion of the fastest? Motivated by evolution experiments with swarming bacteria we searched for a simple rule. In experiments, a fast hyperswarmer mutant that pays a reproductive cost to make many copies of its flagellum invades a population of mono-flagellated bacteria by reaching the expanding population edge; a two-species mathematical model explains that invasion of the edge occurs only if the invasive species' expansion rate, v₂, which results from the combination of the species growth rate and its dispersal speed (but not its carrying capacity), exceeds the established species', v₁. The simple rule that we derive, v₂ > v₁, appears to be general: less favorable initial conditions, such as smaller initial sizes and longer distances to the population edge, delay but do not entirely prevent invasion. Despite intricacies of the swarming system, experimental tests agree well with model predictions suggesting that the general theory should apply to other expanding populations with trade-offs between growth and dispersal, including non-native invasive species and cancer metastases.
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Attribution-NonCommercial-ShareAlike 4.0 International