Tamed spaces -- Dirichlet spaces with distribution-valued Ricci bounds

Erbar, Matthias; Rigoni, Chiara; Sturm, Karl-Theodor; Tamanini, Luca

doi:10.48550/arxiv.2009.03121

Cited by 3 publications

(48 citation statements)

References 31 publications

(65 reference statements)

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“…Taming for LR manifolds. The notion of tamed spaces, summarized in Section 4.1, has recently been introduced in [18]. It offers a synthetic way of speaking about the Ricci curvature of a Dirichlet space being bounded from below by a distribution κ.…”

Section: Corollary 14 Every Lr Manifold Admits a Canonical Heat Kerne...mentioning

confidence: 99%

“…Since elements in K(M ) provide special cases of the relevant distributions considered in [18] and since Ricci bounds have powerful probabilistic, analytic and geometric consequences, we believe our following condition for taming of LR manifolds, cf. Theorem 4.9 below, to be of high interest.…”

Section: Corollary 14 Every Lr Manifold Admits a Canonical Heat Kerne...mentioning

confidence: 99%

“…Chapter 3 introduces the concept of control pairs for the given heat kernel and shows the general existence of such a pair. Lastly, in Chapter 4 we briefly recapitulate basic notions about tamed spaces from [18] and provide sufficient conditions for taming of LR manifolds.…”

Section: Corollary 14 Every Lr Manifold Admits a Canonical Heat Kerne...mentioning

confidence: 99%

“…In view of the above mentioned diversity of examples as well as recent breakthroughs in metric geometry for nonuniform curvature bounds [5,8,18,26,56], we predict the class of LR manifolds -regarded as prototypes of Riemannian spaces with singularities -to have great potential for near future research, which this article aims to initiate.…”

Section: Introductionmentioning

confidence: 99%

“…The prominent role of the Kato class in mathematical physics has been well established in the past decades in a series of works [2,32,49]. Recently, its interest in the context of singular Ricci bounds has grown as well [5,6,7,9,18,24,26,43] (also with applications to Ricci flow and general relativity). The study of the class of LR manifolds in this latter setting constitutes the last part of our work.…”

Section: Introductionmentioning

confidence: 99%

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Heat kernel bounds and Ricci curvature for Lipschitz manifolds

Braun¹,

Rigoni²

2021

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Given any d-dimensional Lipschitz Riemannian manifold (M, g) with heat kernel p, we establish uniform upper bounds on p which can always be decoupled in space and time. More precisely, we prove the existence of a constant C > 0 and a bounded Lipschitz function R : M → (0, ∞) such that for every x ∈ M and every t > 0,This allows us to identify suitable weighted Lebesgue spaces w.r.t. the given volume measure as subsets of the Kato class induced by (M, g). In the case ∂M = ∅, we also provide an analogous inclusion for Lebesgue spaces w.r.t. the surface measure on ∂M .We use these insights to give sufficient conditions for a possibly noncomplete Lipschitz Riemannian manifold to be tamed, i.e. to admit a measure-valued lower bound on the Ricci curvature, formulated in a synthetic sense.

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Section: Corollary 14 Every Lr Manifold Admits a Canonical Heat Kerne...mentioning

confidence: 99%

Section: Corollary 14 Every Lr Manifold Admits a Canonical Heat Kerne...mentioning

confidence: 99%

Section: Corollary 14 Every Lr Manifold Admits a Canonical Heat Kerne...mentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

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Heat kernel bounds and Ricci curvature for Lipschitz manifolds

Braun¹,

Rigoni²

2021

Preprint

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Heat flow on 1-forms under lower Ricci bounds. Functional inequalities, spectral theory, and heat kernel

Braun¹

2020

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We study the canonical heat flow (H ) ≥0 on the cotangent module 2 ( * ) over an RCD( , ∞) space ( , d, m), ∈ ℝ. We show Hess-Schrader-Uhlenbrock's inequality and, if ( , d, m) is also an RCD * ( , ) space, ∈ (1, ∞), Bakry-Ledoux's inequality for (H ) ≥0 w.r.t. the heat flow (P ) ≥0 on 2 ( ). A crucial tool is that the dimensional vector 2-Bochner inequality is self-improving, entailing a dimensional vector 1-Bochner inequality-a version of which is also available in the dimension-free case-as a byproduct. Variable versions of these estimates are discussed as well. In conjunction with a study of logarithmic Sobolev inequalities for 1-forms, the previous inequalities yield various -properties of (H ) ≥0 , ∈ [1, ∞].Then we establish explicit inclusions between the spectrum of its generator, the Hodge Laplacian ⃗ Δ, of the negative functional Laplacian −Δ, and of the Schrödinger operator −Δ + .In the RCD * ( , ) case, we prove compactness of ⃗ Δ −1 if is compact, and the independence of the -spectrum of ⃗ Δ on ∈ [1, ∞] under a volume growth condition.We terminate by giving an appropriate interpretation of a heat kernel for (H ) ≥0 . We show its existence in full generality without any local compactness or doubling assumptions, and derive fundamental estimates and properties of it.

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Vector calculus for tamed Dirichlet spaces

Braun¹

2021

Preprint

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In the language of L ∞ -modules proposed by Gigli, we introduce a first order calculus on a topological Lusin measure space (M , m) carrying a quasi-regular, strongly local Dirichlet form E. Furthermore, we develop a second order calculus if (M , E, m) is tamed by a signed measure in the extended Kato class in the sense of Erbar, Rigoni, Sturm and Tamanini. This allows us to define e.g. Hessians, covariant and exterior derivatives, Ricci curvature, and second fundamental form.

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Tamed spaces -- Dirichlet spaces with distribution-valued Ricci bounds

Cited by 3 publications

References 31 publications

Heat kernel bounds and Ricci curvature for Lipschitz manifolds

Heat kernel bounds and Ricci curvature for Lipschitz manifolds

Heat flow on 1-forms under lower Ricci bounds. Functional inequalities, spectral theory, and heat kernel

Vector calculus for tamed Dirichlet spaces

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