Computing renormalized curvature integrals on Poincar\'e-Einstein manifolds
Abstract
We describe a general procedure for computing renormalized curvature integrals on Poincar\'e-Einstein manifolds. In particular, we explain the connection between the Gauss-Bonnet-type formulas of Albin and Chang-Qing-Yang for the renormalized volume, and explicitly identify a scalar conformal invariant in the latter formula. Our approach constructs scalar conformal invariants of weight -n on n-manifolds, n ≥ 8, that are natural divergences; these imply that the scalar invariant in the Chang-Qing-Yang formula is not unique in dimension n ≥ 8. Our procedure also produces explicit conformally invariant Gauss--Bonnet-type formulas for compact Einstein manifolds.
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