Third order Einstein deformations for Kaehler-Einstein metrics

Abstract

For compact Kähler manifolds (M,g,J) with negative scalar curvature we study the existence problem for non-trivial Einstein deformations of g, that is small time curves gt of Einstein metrics with g0=g. No asssumption on the complex structure J is made; also we do not assume that the metrics gt are Kähler w.r.t. J. We determine explicitly the obstruction to third order Einstein deformation for g; that is we fully solve the equations (gt)(k)(0)=0 for 1 ≤ k 3 in terms of the Taylor expansion g-1gt=+th1+t22!h2+t33!h3+o(t4) at t=0. Up to a suitable gauge transformation we show that third order integrability for the Einstein equation amounts to Maurer-Cartan type equations and polynomial identities relating the coefficients h3,h2,h1. This result is interpreted in terms of the underlying complex geometry of M by means of the Cayley transform of the metric g; the Cayley transform is also used for formulating conjectures for the higher order Einstein deformation problem.