Eric Bahuaud scite author profile

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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Ricci flow of conformally compact metrics

Bahuaud

2011

Ann. Inst. H. Poincaré C Anal. Non Linéaire

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In this paper we prove that given a smoothly conformally compact metric there is a short-time solution to the Ricci flow that remains smoothly conformally compact. We adapt recent results of Schn\"urer, Schulze and Simon to prove a stability result for conformally compact Einstein metrics sufficiently close to the hyperbolic metric.Comment: 26 pages, 2 figures. Version 2 includes stronger stability result and fixes several typo

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Intrinsic characterization for Lipschitz asymptotically hyperbolic metrics

Bahuaud¹

2009

Pacific J. Math.

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Conformally compact asymptotically hyperbolic metrics have been intensively studied. The goal of this note is to understand what intrinsic conditions on a complete Riemannian manifold (M, g) will ensure that g is AH in this sense. We use the geodesic compactification by asymptotic geodesic rays to compactify M and appropriate curvature decay conditions to study the regularity of the conformal compactification.

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Short-Time Existence for Some Higher-Order Geometric Flows

Bahuaud

Helliwell

2011

Communications in Partial Differential Equations

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Abstract. We establish short-time existence and regularity for higher-order flows generated by a class of polynomial natural tensors that, after an adjustment by the Lie derivative of the metric with respect to a suitable vector field, have strongly parabolic linearizations. We apply this theorem to flows by powers of the Laplacian of the Ricci tensor, and to flows generated by the ambient obstruction tensor. As a special case, we prove short-time existence for a type of Bach flow.

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Conformal Compactification of Asymptotically Locally Hyperbolic Metrics

Bahuaud¹,

Gicquaud²

2010

J Geom Anal

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Abstract. In this paper we study the extent to which conformally compact asymptotically hyperbolic metrics may be characterized intrinsically. Building on the work of the first author in [6], we prove that decay of sectional curvature to −1 and decay of covariant derivatives of curvature outside an appropriate compact set yield Hölder regularity for a conformal compactification of the metric. In the Einstein case, we prove that the estimate on the sectional curvature implies the control of all covariant derivatives of the Weyl tensor, permitting us to strengthen our result.

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Eric Bahuaud

Yamabe flow on manifolds with edges

Ricci flow of conformally compact metrics

Intrinsic characterization for Lipschitz asymptotically hyperbolic metrics

Short-Time Existence for Some Higher-Order Geometric Flows

Conformal Compactification of Asymptotically Locally Hyperbolic Metrics

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