Expectations on fractal sets

Bailey, David H.; Borwein, Jonathan M.; Crandall, Richard E,; Rose, Michael G.

Title: Expectations on fractal sets
Creator: Bailey, David H.; Borwein, Jonathan M.; Crandall, Richard E,; Rose, Michael G.
Relation: Office of Computational and Technology Research, Division of Mathematical, Information, and Computational Sciences of the U.S. Department of Energy.DE-AC02-05CH11231
Relation: Applied Mathematics and Computation Vol. 220, p. 695-721
Publisher Link: http://dx.doi.org/10.1016/j.amc.2013.06.078
Publisher: Elsevier
Resource Type: journal article
Date: 2013
Description: Using fractal self-similarity and functional-expectation relations, the classical theory of box integrals – being expectations on unit hypercubes – is extended to a class of fractal “string-generated Cantor sets” (SCSs) embedded in unit hypercubes of arbitrary dimension. Motivated by laboratory studies on the distribution of brain synapses, these SCSs were designed for dimensional freedom – a suitable choice of generating string allows for fine-tuning the fractal dimension of the corresponding set. We also establish closed forms for certain statistical moments on SCSs, develop a precision algorithm for high embedding dimensions, and report various numerical results. The underlying numerical quadrature issues are in themselves quite challenging.
Subject: expectations; fractals; self-similarity; numerical quadrature; Monte Carlo methods
Identifier: http://hdl.handle.net/1959.13/1295551
Identifier: uon:19060
Identifier: ISSN:0096-3003
Language: eng
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