Diophantine property of matrices and attractors of projective iterated function systems in RP1
Abstract
We prove that almost every finite collection of matrices in GLd(R) and SLd(R) with positive entries is Diophantine. Next we restrict ourselves to the case d=2. A finite set of SL2(R) matrices induces a (generalized) iterated function system on the projective line RP1. Assuming uniform hyperbolicity and the Diophantine property, we show that the dimension of the attractor equals the minimum of 1 and the critical exponent.
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