Uniformly perfect measures on strictly convex planar graphs are L2-flattening
Abstract
Uniformly perfect measures are a common generalisation of Ahlfors regular measures, self-conformal measures on the line, and their push-forwards under sufficiently regular maps. We show that every uniformly perfect measure σ on a strictly convex planar C2-graph is L2-flattening. That is, for every ε>0, there exists p = p(ε,σ) ≥ 1 such that \|σ\|Lp(B(R))p ε,σ Rε, R ≥ 1.
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