Geodesics in the space of K\"ahler cone metrics

Abstract

In this paper, we study the Dirichlet problem of the geodesic equation in the space of K\"ahler cone metrics H; that is equivalent to a homogeneous complex Monge-Amp\`ere equation whose boundary values consist of K\"ahler metrics with cone singularities. Our approach concerns the generalization of the space defined in Donaldson MR2975584 to the case of K\"ahler manifolds with boundary; moreover we introduce a subspace HC of H which we define by prescribing appropriate geometric conditions. Our main result is the existence, uniqueness and regularity of C1,1 geodesics whose boundary values lie in HC. Moreover, we prove that such geodesic is the limit of a sequence of C2, approximate geodesics under the C1,1-norm. As a geometric application, we prove the metric space structure of HC.