Data from: Fractal measures of spatial pattern as a heuristic for return rate in vegetative systems

Michael A. Irvine, Emma L. Jackson, Emma J. Kenyon, Kevan J. Cook, Matthew J. Keeling & James C. Bull
Measurement of population persistence is a long-standing problem in ecology; in particular, whether it is possible to gain insights into persistence without long time-series. Fractal measurements of spatial patterns, such as the Korcak exponent or boundary dimension, have been proposed as indicators of the persistence of underlying dynamics. Here we explore under what conditions a predictive relationship between fractal measures and persistence exists. We combine theoretical arguments with an aerial snapshot and time series from...
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