The Hausdorff measure and uniform fibre conditions for Bara\'nski carpet

Abstract

For a self-affine carpet K of Bara\'nski, we establish a dichotomy: either 0<HH K(K)<+∞ or H K(K)=+∞. We introduce four types of uniform fibre condition for K: Hausdorff (u.f.H), Box (u.f.B), Assouad (u.f.A), and Lower (u.f.L), which are progressively stronger, with u.f.L u.f.A u.f.B u.f.H, and each implication is strict. The condition u.f.H serves as a criterion for the dichotomy. The remaining three conditions provide an equivalent characterization for the coincidence of any two distinct dimensions. The condition u.f.L is also equivalent to the Ahlfors regularity of K. As a corollary, H K=B K is sufficient but not necessary for 0<HH K(K)<+∞.

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