Examples of asymptotically conical Ricci-flat K\"ahler manifolds

Abstract

The author has proved that a crepant resolution Y of a Ricci-flat K\"ahler cone X admits a complete Ricci-flat K\"ahler metric asymptotic to the cone metric in every K\"ahler class in H2c(Y,). These manifolds are generalizations of the Ricci-flat ALE K\"ahler spaces known by the work of P. Kronheimer, D. Joyce and others. This article considers further the problem of constructing examples. We show that every 3-dimensional Gorenstein toric K\"ahler cone admits a crepant resolution for which the above theorem applies. This gives infinitely many examples of asymptotically conical Ricci-flat manifolds. Then other examples are given of which are crepant resolutions hypersurface singularities which are known to admit Ricci-flat K\"ahler cone metrics by the work of C. Boyer, K. Galicki, J. Koll\'ar, and others. Two families of hypersurface examples are given which are distinguished by the condition b3(Y)=0 or b3(Y)>0.