Volume renormalization of higher-codimension singular Yamabe spaces

Abstract

Given an embedded closed submanifold n in the closed Riemannian manifold Mn + k, where k < n + 2, we define extrinsic global conformal invariants of by renormalizing the volume associated to the unique singular Yamabe metric with singular set . In case n is odd, the renormalized volume is an absolute conformal invariant, while if n is even, there is a conformally invariant energy term given by the integral of a local Riemannian submanifold invariant. In particular, the renormalized volume gives a global conformal invariant of a knot embedding in the three-sphere. We compute the variations of these quantities with respect to variations of the submanifold. We extend the construction of energies for even n to general codimension by considering formal solutions to the singular Yamabe problem; except that, for each fixed n, there are finitely many k ≥ n + 2, which we identify, for which the smoothness of the formal solution is obstructed and we obtain instead a pointwise conformal invariant. We compute the new quantities in several cases.