On the projections of Ahlfors regular sets in the plane

Abstract

This paper contains the following δ-discretised projection theorem for Ahlfors regular sets in the plane. For all C,ε > 0 and s ∈ [0,1], there exists > 0 such that the following holds for all δ > 0 small enough. Let be a Borel probability measure on S1 satisfying (B(x,r)) ≤ Crε for all x ∈ S1 and r > 0. Let K ⊂ B(1) ⊂ R2 be Ahlfors s-regular with constant at most C. Then, there exists a vector θ ∈ spt\, such that |πθ(F)|δ ≥ δε - s for all F ⊂ K with |F|δ ≥ δ - s. Here πθ(z) = θ · z for z ∈ R2.

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