Fibre stability for dominated self-affine sets

Abstract

Let K be a planar self-affine set. Assuming a weak domination condition on the matrix parts, we prove for all backward Furstenberg directions V that E∈Tan(K) x∈ πV(E) dimH (πV^-1(x) E) = dimA K - dimA πV(K). Here, Tan(K) denotes the space of weak tangents of K. Unlike previous work on this topic, we require no separation or irreducibility assumptions. However, if in addition the strong separation condition holds, then there exists a V∈ XF so that x∈ πV(K) dimH (πV^-1(x) K) = dimA K - dimA πV(K). Our key innovation is an amplification result for slices of weak tangents via pigeonholing arguments.

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