Minimal box size for fractal dimension estimation

Rosenberg, E. (2016) Minimal box size for fractal dimension estimation. Community Ecology, 17 (1). pp. 24-27. ISSN 1585-8553

Preview

Text 168.2016.17.1.4.pdf Download (1MB) | Preview

Abstract

We extend Kenkel’s model for determining the minimal allowable box size s* to be used in computing the box counting dimension of a self-similar geometric fractal. This minimal size s* is defined in terms of a specified parameter ε which is the deviation of a computed slope from the box counting dimension. We derive an exact implicit equation for s* for any ε. We solve the equation using binary search, compare our results to Kenkel’s, and illustrate how s* varies with ε. A listing of the Python code for the binary search is provided. We also derive a closed form estimate for s* having the same functional form as Kenkel’s empirically obtained expression.

Actions (login required)

Edit Item