Boundary Regularity for Asymptotically Hyperbolic Metrics with Smooth Weyl Curvature
Abstract
In this paper, we study the regularity of asymptotically hyperbolic metrics with Einstein condition near boundary and Weyl curvature smooth enough in arbitrary dimension. Following Michael Anderson's method, we show that Cm,α conformally compact Riemannian metrics with Einstein equation vanishing to finite order near boundary have conformal compactifications that are Cm+2,α up to the boundary when Weyl curvature is in Cm,α and the boundary metric is in Cm+2,α where m≥ 3.
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