On the fine structure of stationary measures in systems which contract-on-average

Abstract

Suppose \f1,...,fm\ is a set of Lipschitz maps of Rd. We form the iterated function system (IFS) by independently choosing the maps so that the map fi is chosen with probability pi (Σi=1m pi=1). We assume that the IFS contracts on average. We give an upper bound for the Hausdorff dimension of the invariant measure induced on Rd and as a corollary show that the measure will be singular if the modulus of the entropy Σi pi pi is less than d times the modulus of the Lyapunov exponent of the system. Using a version of Shannon's Theorem for random walks on semigroups we improve this estimate and show that it is actually attainable for certain cases of affine mappings of R.

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