2017
DOI: 10.1007/s11118-017-9656-4
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The Isometry Group of an RCD ∗ Space is Lie

Abstract: We give necessary and sufficient conditions that show that both the group of isometries and the group of measure-preserving isometries are Lie groups for a large class of metric measure spaces. In addition we study, among other examples, whether spaces having a generalized lower Ricci curvature bound fulfill these requirements. The conditions are satisfied by RCD * -spaces and, under extra assumptions, by CD-spaces, CD * -spaces, and MCP-spaces. However, we show that the MCP-condition by itself is not enough t… Show more

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Cited by 15 publications
(21 citation statements)
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References 34 publications
(76 reference statements)
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“…The following lemma was observed by the fourth author [68] and, independently, by Guijarro-Santos-Rodríguez [38]. We present an independent argument for the reader's convenience.…”
Section: 2mentioning
confidence: 62%
See 2 more Smart Citations
“…The following lemma was observed by the fourth author [68] and, independently, by Guijarro-Santos-Rodríguez [38]. We present an independent argument for the reader's convenience.…”
Section: 2mentioning
confidence: 62%
“…y ∈ M , it holds that the isotropy groups G y = gG x0 g −1 and G x0 are conjugate. Thus, since the action of G is effective and for every x ∈ M , G/G x acts transitively on the orbit G(x) we conclude that the orbits [46] by Ketterer and Rajala, and generalized in [68] by the fourth author. We note that none of these spaces has good transport behavior, or equivalently in this case, the essential non-branching condition.…”
Section: Principal Orbit Theorem and Cohomogeneity One Actionsmentioning
confidence: 73%
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“…In [24], and indenpendently in [37], it was shown that the isometry group of an RCD * (K, N ) space is a Lie group. Therefore it makes sense now to study properties of Lie group actions on m.m.s.…”
Section: Introduction and Statement Of Resultsmentioning
confidence: 99%
“…A priori one would assume that the metric structure and the measure have no relationship at all; however we have the following result. The following was obtained in [24], and independently by Sosa [37]. Theorem 2.19.…”
Section: 5mentioning
confidence: 90%