Journal ArticleOpen Access
Dyadic Cantor set and its kinetic and stochastic counterpart
Author Affiliations
University of Dhaka, Potsdam Institute for Climate Impact Research
Published InChaos Solitons & Fractals
Year2014
Citations7
Abstract
Firstly, we propose and investigate a dyadic Cantor set (DCS) and its kinetic counterpart where a generator divides an interval into two equal parts and removes one with probability ( 1 - p ) . The generator is then applied at each step to all the existing intervals in the case of DCS and to only one interval, picked with probability according to interval size, in the case of kinetic DCS. Secondly, we propose a stochastic DCS in which, unlike the kinetic DCS, the generator divides an interval randomly instead of equally into two parts. Finally, the models are solved analytically; an exact expression for fractal dimension in each case is presented and the relationship between fractal dimension and the…
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Fields & Keywords
Physical SciencesPhysics and AstronomyCondensed Matter PhysicsTheoretical and Computational PhysicsComplex Systems and Time Series AnalysisNeural Networks and ApplicationsStatistical physicsDiscrete mathematicsCombinatoricsMathematical analysisGeometryClassical mechanicsQuantum mechanicsProgramming language