Coarea Inequality for Monotone Functions on Metric Surfaces

Abstract

We study coarea inequalities for metric surfaces -- metric spaces that are topological surfaces, without boundary, and which have locally finite Hausdorff 2-measure H2. For monotone Sobolev functions u X R , we prove the inequality equation* ∫ R * ∫ u-1(t) g \,dH1 \,dt ≤ ∫ X g \,dH2 every Borel g X → [0,∞], equation* where is any integrable upper gradient of u. If is locally L2-integrable, we obtain the sharp constant =4/π. The monotonicity condition cannot be removed as we give an example of a metric surface X and a Lipschitz function u X R for which the coarea inequality above fails.