The Globalization Theorem for the Curvature Dimension Condition

Cavalletti, Fabio; Milman, Emanuel

doi:10.48550/arxiv.1612.07623

Cited by 44 publications

(112 citation statements)

References 52 publications

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“…The class RCD(K, N ) was proposed in [G15], motivated by the validity of the sharp Laplacian comparison and of the Cheeger-Gromoll splitting theorem, proved in [G13]. The (a priori more general) RCD * (K, N ) condition was thoroughly analysed in [EKS15] and (subsequently and independently) in [AMS15] (see also [CM16] for the equivalence betweeen RCD * and RCD in the case of finite reference measure).…”

Section: 2mentioning

confidence: 99%

Weak Laplacian bounds and minimal boundaries in non-smooth spaces with Ricci curvature lower bounds

Mondino¹,

Semola²

2021

Preprint

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The goal of the paper is four-fold. In the setting of non-smooth spaces with Ricci curvature lower bounds (more precisely RCD(K, N ) metric measure spaces):• We establish a new principle relating lower Ricci curvature bounds to the preservation of Laplacian lower bounds under the evolution via the p-Hopf-Lax semigroup, for general exponents p ∈ [1, ∞).• We develop an instrinsic viscosity theory of Laplacian bounds.• We prove Laplacian bounds on the distance function from a set (locally) minimizing the perimeter; this corresponds to vanishing mean curvature in the smooth setting.• We initiate a regularity theory for boundaries of sets (locally) minimizing the perimeter. The class of RCD(K, N ) metric measure spaces includes as remarkable sub-classes: measured Gromov-Hausdorff limits of smooth manifolds with lower Ricci curvature bounds and finite dimensional Alexandrov spaces with lower sectional curvature bounds. Most of the results are new also in these frameworks.

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Section: 2mentioning

confidence: 99%

Weak Laplacian bounds and minimal boundaries in non-smooth spaces with Ricci curvature lower bounds

Mondino¹,

Semola²

2021

Preprint

View full text Add to dashboard Cite

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“…After the introduction, in the independent works [63,64] and [46], of the curvature dimension condition CD(K, N) encoding in a synthetic way the notion of Ricci curvature bounded from below by K and dimension bounded above by N, the definition of RCD(K, N) m.m.s. was first proposed in [40] and then studied in [41,38,12], see also [28] for the equivalence between the RCD * (K, N) and the RCD(K, N) condition. The infinite dimensional counterpart of this notion had been previously investigated in [9], see also [8] for the case of σ-finite reference measures.…”

Section: 2mentioning

confidence: 99%

The isoperimetric problem via direct method in noncompact metric measure spaces with lower Ricci bounds

Antonelli,

Nardulli,

Pozzetta

2022

Preprint

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We establish a structure theorem for minimizing sequences for the isoperimetric problem on noncompact RCD(K, N ) spaces (X, d, H N ). Under the sole (necessary) assumption that the measure of unit balls is uniformly bounded away from zero, we prove that the limit of such a sequence is identified by a finite collection of isoperimetric regions possibly contained in pointed Gromov-Hausdorff limits of the ambient space X along diverging sequences of points. The number of such regions is bounded linearly in terms of the measure of the minimizing sequence.The result follows from a new generalized compactness theorem, which identifies the limit of a sequence of sets E i ⊂ X i with uniformly bounded measure and perimeter, where (X i , d i , H N ) is an arbitrary sequence of RCD(K, N ) spaces.An abstract criterion for a minimizing sequence to converge without losing mass at infinity to an isoperimetric set is also discussed. The latter criterion is new also for smooth Riemannian spaces.

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“…After the introduction, in the independent works [61,62] and [45], of the curvature dimension condition CD(K, N) encoding in a synthetic way the notion of Ricci curvature bounded from below by K and dimension bounded above by N, the definition of RCD(K, N) m.m.s. was first proposed in [30] and then studied in [31,26,13], see also [20] for the equivalence between the RCD * (K, N) and the RCD(K, N) condition in the case the reference measure is finite. The infinite dimensional counterpart of this notion had been previously investigated in [11], see also [8] for the case of σ-finite reference measures.…”

Section: 23mentioning

confidence: 99%

Isoperimetric sets in spaces with lower bounds on the Ricci curvature

Antonelli,

Pasqualetto,

Pozzetta

2021

Preprint

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In this paper we study regularity and topological properties of volume constrained minimizers of quasi-perimeters in RCD spaces where the reference measure is the Hausdorff measure. A quasi-perimeter is a functional given by the sum of the usual perimeter and of a suitable continuous term. In particular, isoperimetric sets are a particular case of our study.We prove that on an RCD(K, N ) space (X, d, H N ), with K ∈ R, N ≥ 2, and a uniform bound from below on the volume of unit balls, volume constrained minimizers of quasi-perimeters are open bounded sets with (N − 1)-Ahlfors regular topological boundary coinciding with the essential boundary.The proof is based on a new Deformation Lemma for sets of finite perimeter in RCD(K, N ) spaces (X, d, m) and on the study of interior and exterior points of volume constrained minimizers of quasi-perimeters.The theory applies to volume constrained minimizers in smooth Riemannian manifolds, possibly with boundary, providing a general regularity result for such minimizers in the smooth setting.

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The Globalization Theorem for the Curvature Dimension Condition

Cited by 44 publications

References 52 publications

Weak Laplacian bounds and minimal boundaries in non-smooth spaces with Ricci curvature lower bounds

Weak Laplacian bounds and minimal boundaries in non-smooth spaces with Ricci curvature lower bounds

The isoperimetric problem via direct method in noncompact metric measure spaces with lower Ricci bounds

Isoperimetric sets in spaces with lower bounds on the Ricci curvature

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