Examples of compact Einstein four-manifolds with negative curvature

Abstract

We give new examples of compact, negatively curved Einstein manifolds of dimension 4. These are seemingly the first such examples which are not locally homogeneous. Our metrics are carried by a sequence of 4-manifolds (Xk) previously considered by Gromov and Thurston. The construction begins with a certain sequence (Mk) of hyperbolic 4-manifolds, each containing a totally geodesic surface k which is nullhomologous and whose normal injectivity radius tends to infinity with k. For a fixed choice of natural number l, we consider the l-fold cover Xk Mk branched along k. We prove that for any choice of l and all large enough k (depending on l), Xk carries an Einstein metric of negative sectional curvature. The first step in the proof is to find an approximate Einstein metric on Xk, which is done by interpolating between a model Einstein metric near the branch locus and the pull-back of the hyperbolic metric from Mk. The second step in the proof is to perturb this to a genuine solution to Einstein's equations, by a parameter dependent version of the inverse function theorem. The analysis relies on a delicate bootstrap procedure based on L2 coercivity estimates.