Geometric and analytic quasiconformality in metric measure spaces

Abstract

We prove the equivalence between geometric and analytic definitions of quasiconformality for a homeomorphism f X→ Y between arbitrary locally finite separable metric measure spaces, assuming no metric hypotheses on either space. When X and Y have locally Q-bounded geometry and Y is contained in an Alexandrov space of curvature bounded above, the sharpness of our results implies that, as in the classical case, the modular and pointwise outer dilatations of are related by KO(f)= esssup HO(x,f).