Equivalence of two different notions of tangent bundle on rectifiable metric measure spaces

Abstract

We prove that for a suitable class of metric measure spaces, the abstract notion of tangent module as defined by the first author can be isometrically identified with the space of L2-sections of the `Gromov-Hausdorff tangent bundle'. The class of spaces ( X, d, m) we consider are PI spaces that for every >0 admit a countable collection of Borel sets (Ui) covering m-a.e.\ X and corresponding (1+)-biLipschitz maps i:Ui Rki such that (i)* m3pt|Ui Lki. This class is known to contain RCD*(K,N) spaces. Part of the work we carry out is that to give a meaning to notion of L2-sections of the Gromov-Hausdorff tangent bundle, in particular explaining what it means to have a measurable map assigning to m-a.e.\ x∈ X an element of the pointed-Gromov-Hausdorff limit of the blow-up of X at x.