Configuration spaces over singular spaces -- I. Dirichlet-Form and Metric Measure Geometry

Abstract

We construct a canonical differential structure on the configuration space over a singular base space X and with a general invariant measure μ on . We present an analytic structure on , constructing a strongly local Dirichlet form E on L2(, μ) for μ in a large class of probability measures. We then investigate the geometric structure of the extended metric measure space endowed with the L2-transportation extended distance d and with the measure μ. By establishing Rademacher- and Sobolev-to-Lipschitz-type properties for E, we finally provide a complete identification of the analytic and the geometric structure -- the canonical differential structure induced on by X and μ -- showing that E coincides with the Cheeger energy of (,d,μ) and that the intrinsic distance of E coincides with d. The class of base spaces to which our results apply includes sub-Riemannian manifolds, RCD spaces, and path/loop spaces over Riemannian manifolds; as for μ our results include quasi-Gibbs measures, in particular: Poisson measures, canonical Gibbs measures, as well as some determinantal/permanental point processes (sineβ, Airyβ, Besselα,β, Ginibre). A number of applications to interacting particle systems and infinite-dimensional metric measure geometry are also discussed. In particular, we prove the universality of the L2-transportation distance d for the Varadhan short-time asymptotics for diffusions on , regardless of the choice of μ. Many of our results are new even in the case of configuration spaces over Euclidean spaces.