Invariant measures and lower Ricci curvature bounds
Abstract
Given a metric measure space (X,d,m) that satisfies the Riemannian Curvature Dimension condition, RCD*(K,N), and a compact subgroup of isometries G ≤ Iso(X) we prove that there exists a G-invariant measure, mG, equivalent to m such that (X,d,mG) is still a RCD*(K,N) space. We also obtain some applications to Lie group actions on RCD*(K,N) spaces. We look at homogeneous spaces, symmetric spaces and obtain dimensional gaps for closed subgroups of isometries.
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