The signature package on Witt spaces

Albin, Pierre; Leichtnam, Éric; Mazzeo, Rafe; Piazza, Paolo

doi:10.24033/asens.2165

Cited by 100 publications

(213 citation statements)

References 57 publications

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“…Fortunately we need very few consequences of such a calculus and can deduce these from a somewhat primitive parametrix construction. This is carried out in more detail in [4]. Recall that we wish to construct an operator G such that, with L equal to the conformal Laplacian for g, GL = I − Q where Q maps into A ν (M ), which has mapping properties analogous to (3.6), (3.7), (3.8), and finally, so that the commutator [∂ y , G] enjoys the same mapping properties.…”

Section: The General Casementioning

confidence: 99%

“…Further details can be found in in the foundational monograph of Verona [31] and the exposition by Pflaum [24]. Basic definitions vary between sources, and the recent paper [4] provides a clarification and unified presentation of some of this material; we follow the notation and development of [4, §2] and refer to it for all further details, in particular, for a proof that this class of spaces coincides with the class of iterated edge spaces considered by Cheeger [11], cf. also [19].…”

Section: Smoothly Stratified Spacesmentioning

confidence: 99%

“…A smoothly stratified space X is a pseudomanifold if the stratum of maximal dimension is dense in X. In distinction to [4], we allow X to have strata of codimension one, but since hypersurface boundaries play a somewhat different role in our main theorem, we say that X is an iterated edge space (or smoothly stratified pseudomanifold) with boundary in this case. • Any element X ∈ I k has a well-defined dimension, where in the decomposition above, dim…”

Section: Smoothly Stratified Spacesmentioning

confidence: 99%

“…This extends the definition to spaces of depth j + 1. (This smoothness hypothesis excludes many spaces that constitute the standard broader class of stratified spaces, where these local trivializations are only required to be continuous; see [4] for more on this.) A smoothly stratified space X is a pseudomanifold if the stratum of maximal dimension is dense in X.…”

Section: Smoothly Stratified Spacesmentioning

confidence: 99%

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The Yamabe problem on stratified spaces

2014

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We introduce new invariants of a Riemannian singular space, the local Yamabe and Sobolev constants, and then go on to prove a general version of the Yamabe theorem under that the global Yamabe invariant of the space is strictly less than one or the other of these local invariants. This rests on a small number of structural assumptions about the space and of the behavior of the scalar curvature function on its smooth locus. The second half of this paper shows how this result applies in the category of smoothly stratified pseudomanifolds, and we also prove sharp regularity for the solutions on these spaces. This sharpens and generalizes the results of Akutagawa and Botvinnik [3] on the Yamabe problem on spaces with isolated conic singularities.

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Section: The General Casementioning

confidence: 99%

Section: Smoothly Stratified Spacesmentioning

confidence: 99%

Section: Smoothly Stratified Spacesmentioning

confidence: 99%

Section: Smoothly Stratified Spacesmentioning

confidence: 99%

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The Yamabe problem on stratified spaces

2014

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“…We refer to α has the cone angle of the stratum Σ n−2 . On a stratified space we can consider an iterate edge metric, as defined in [3] or [1], which is a smooth Riemannian metric on the regular set Ω, and define the usual tools of geometric analysis.…”

Section: Introductionmentioning

confidence: 99%

An Obata singular theorem for stratified spaces

Mondello

2017

Trans. Amer. Math. Soc.

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Abstract. Consider a stratified space with a positive Ricci lower bound on the regular set and no cone angle larger than 2π. For such stratified space we know that the first non-zero eigenvalue of the Laplacian is larger than or equal to the dimension. We prove here an Obata rigidity result when the equality is attained: the lower bound of the spectrum is attained if and only if the stratified space is isometric to a spherical suspension. Moreover, we show that the diameter is at most equal to π, and it is equivalent for the diameter to be equal to π and for the first non-zero eigenvalue of the Laplacian to be equal to the dimension. We finally give a consequence of these results related to the Yamabe problem. Consider an Einstein stratified space without cone angles larger than 2π: if there is a metric conformal to the Einstein metric and with constant scalar curvature, then it is an Einstein metric as well. Furthermore, if its conformal factor is not a constant, then the space is isometric to a spherical suspension. MSC2010: 53 Differential geometry, 58 Global analysis, analysis on manifolds.

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Yamabe flow on manifolds with edges

Bahuaud

Vertman

2013

Mathematische Nachrichten

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Abstract. Let (M, g) be a compact oriented Riemannian manifold with an incomplete edge singularity. This article shows that it is possible to evolve g by the Yamabe flow within a class of singular edge metrics. As the main analytic step we establish parabolic Schaudertype estimates for the heat operator on certain Hölder spaces adapted to the singular edge geometry. We apply these estimates to obtain local existence for a variety of quasilinear equations, including the Yamabe flow. This provides a setup for a subsequent discussion of the Yamabe problem using flow techniques in the singular setting.

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The signature package on Witt spaces

Cited by 100 publications

References 57 publications

The Yamabe problem on stratified spaces

The Yamabe problem on stratified spaces

An Obata singular theorem for stratified spaces

Yamabe flow on manifolds with edges

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