The Entropy of Cantor--like measures
Abstract
By a Cantor-like measure we mean the unique self-similar probability measure μ satisfying μ =Σi=0m-1piμ Si-1 where % Si(x)=xd+id· d-1m-1 for integers 2≤ d<m 2d-1 and probabilities pi>0, Σ pi=1. In the uniform case (pi=1/m for all i) we show how one can compute the entropy and Hausdorff dimension to arbitrary precision. In the non-uniform case we find bounds on the entropy.
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