Lévy processes, saltatory foraging, and superdiffusion


Burrow, J. F., Baxter P. D., and Pitchford, J. W.

It is well established that resource variability generated by spatial patchiness and turbulence is an important influence on the growth and recruitment of planktonic fish larvae. Empirical data show fractal-like prey distributions, and simulations indicate that scale-invariant foraging strategies may be optimal. Here we show how larval growth and recruitment in a turbulent environment can be formulated as a hitting time problem for a jump-diffusion process. We present two theoretical results. Firstly, if jumps are of a fixed size and occur as a Poisson process (embedded within a drift-diffusion), recruitment is comparable to a diffusion process alone. Secondly, in the absence of diffusion, and for `patchy' jumps (of negative binomial size with Pareto inter-arrivals), the encounter process becomes superdiffusive. To synthesise these results we conduct a strategic simulation study where `patchy' jumps are embedded in a drift-diffusion process. We conclude that increasingly Lévy-like predator foraging strategies can have a significantly positive effect on recruitment at the population level. Key words: fish larvae, power law, Pareto distribution, hitting time, jump-diffusion, Lévy walk


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