A canonical infinitesimally Hilbertian structure on locally Minkowski spaces

Abstract

The aim of this paper is to show the existence of a canonical distance d' defined on a locally Minkowski metric measure space ( X, d, m) such that: i) d' is equivalent to d, ii) ( X, d', m) is infinitesimally Hilbertian. This new regularity assumption on ( X, d, m) essentially forces the structure to be locally similar to a Minkowski space and defines a class of metric measure structures which includes all the Finsler manifolds, and it is actually strictly larger. The required distance d' will be the intrinsic distance dKS associated to the so-called Korevaar-Schoen energy, which is proven to be a quadratic form. In particular, we show that the Cheeger energy associated to the metric measure space ( X, dKS, m) is in fact the Korevaar-Schoen energy.