Mass and volume of four-dimensional Einstein metrics
Abstract
Let (M4,g) be an Einstein manifold, where M4 is a smooth, closed, oriented four-manifold M4 and g has positive Einstein constant. Given a point 0 ∈ M4, let G denote the (positive) Green's function G of the conformal laplacian Lg; then g = G2 g is a complete, scalar-flat, asymptotically flat metric on M = M \ 0 \. We first show that the ADM mass of g can be expressed as an integral over M, then use this identity to prove a lower bound for the mass of g in terms of the volume of g. As corollaries, we prove a 'mass times volume' inequality, plus various mass gap theorems characterizing the round metric on S4 and the Fubini-Study metric on CP2.
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