Thurston obstructions and Ahlfors regular conformal dimension

Abstract

Let f: S2 S2 be an expanding branched covering map of the sphere to itself with finite postcritical set Pf. Associated to f is a canonical quasisymmetry class (f) of Ahlfors regular metrics on the sphere in which the dynamics is (non-classically) conformal. We show \[ ∈fX ∈ (f) (X) ≥ Q(f)=∈f \Q ≥ 2: λ(f,Q) ≥ 1\.\] The infimum is over all multicurves ⊂ S2-Pf. The map f,Q: is defined by \[ f, Q(γ) =Σ[γ']∈ Σδ γ' (f:δ γ)1-Q[γ'],\] where the second sum is over all preimages δ of γ freely homotopic to γ' in S2-Pf, and λ(f,Q) is its Perron-Frobenius leading eigenvalue. This generalizes Thurston's observation that if Q(f)>2, then there is no f-invariant classical conformal structure.