Calabi-Yau manifolds with isolated conical singularities

Abstract

Let X be a complex projective variety with only canonical singularities and with trivial canonical bundle. Let L be an ample line bundle on X. Assume that the pair (X,L) is the flat limit of a family of smooth polarized Calabi-Yau manifolds. Assume that for each singular point x ∈ X there exist a Kahler-Einstein Fano manifold Z and a positive integer q dividing KZ such that -1qKZ is very ample and such that the germ (X,x) is locally analytically isomorphic to a neighborhood of the vertex of the blow-down of the zero section of 1qKZ. We prove that up to biholomorphism, the unique weak Ricci-flat Kahler metric representing 2π c1(L) on X is asymptotic at a polynomial rate near x to the natural Ricci-flat Kahler cone metric on 1qKZ constructed using the Calabi ansatz. In particular, our result applies if (X, O(1)) is a nodal quintic threefold in P4. This provides the first known examples of compact Ricci-flat manifolds with non-orbifold isolated conical singularities.