On the Moduli of Lipschitz Homology Classes

Abstract

We define a type of modulus dModp for Lipschitz surfaces based on Lp-integrable measurable differential forms, generalizing the vector modulus of Aikawa and Ohtsuka. We show that this modulus satisfies a homological duality theorem, where for H\"older conjugate exponents p, q ∈ (1, ∞), every relative Lipschitz k-homology class c has a unique dual Lipschitz (n-k)-homology class c' such that dModp1/p(c) dModq1/q(c') = 1 and the Poincar\'e dual of c maps c' to 1. As dModp is larger than the classical surface modulus Modp, we immediately recover a more general version of the estimate Modp1/p(c) Modq1/q(c') ≤ 1, which appears in works by Freedman and He and by Lohvansuu. Our theory is formulated in the general setting of Lipschitz Riemannian manifolds, though our results appear new in the smooth setting as well. We also provide a characterization of closed and exact Sobolev forms on Lipschitz manifolds based on integration over Lipschitz k-chains.