Dimension of Furstenberg measures on CP1
Abstract
Let θ be a finitely supported probability measure on SL(2,C), and suppose that the semigroup generated by G:=supp(θ) is strongly irreducible and proximal. Let μ denote the Furstenberg measure on CP1 associated to θ. Assume further that no generalized circle is fixed by all M\"obius transformations corresponding to elements of G, and that G satisfies a mild Diophantine condition. Under these assumptions, we prove that μ=\ 2,hRW/(2)\ , where hRW and denote the random walk entropy and Lyapunov exponent associated to θ, respectively. Since our result expresses μ in terms of the random walk entropy rather than the Furstenberg entropy, and relies only on a mild Diophantine condition as a separation assumption, we are forced to directly confront difficulties arising from the ambient space CP1 having real dimension 2 rather than 1. Moreover, our analysis takes place in a projective, contracting-on-average setting. This combination of features introduces significant challenges and requires genuinely new ideas.
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