A Dichotomy for the dimension of solenoidal attractors on high dimensional space

Abstract

We study dynamical systems generated by skew products: T: [0,1)×C [0,1)×C T(x,y)=(bx1,γ y+φ(x)) where integer b2, γ∈C such that 0<|γ|<1, and φ is a real analytic Z-periodic function. Let ∈[0,1) such that γ=|γ|e2π i. For the case we prove the following dichotomy for the solenoidal attractor Kφb,\,γ for T: Either Kφb,\,γ is a graph of real analytic function, or the Hausdorff dimension of Kφb,\,γ is equal to \3,1+ b1/|γ|\. Furthermore, given b and φ, the former alternative only happens for countable many γ unless φ is constant.

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