Conification of K\"ahler and hyper-K\"ahler manifolds

Abstract

Given a K\"ahler manifold M endowed with a Hamiltonian Killing vector field Z, we construct a conical K\"ahler manifold M such that M is recovered as a K\"ahler quotient of M. Similarly, given a hyper-K\"ahler manifold (M,g,J1,J2,J3) endowed with a Killing vector field Z, Hamiltonian with respect to the K\"ahler form of J1 and satisfying LZJ2= -2J3, we construct a hyper-K\"ahler cone M such that M is a certain hyper-K\"ahler quotient of M. In this way, we recover a theorem by Haydys. Our work is motivated by the problem of relating the supergravity c-map to the rigid c-map. We show that any hyper-K\"ahler manifold in the image of the c-map admits a Killing vector field with the above properties. Therefore, it gives rise to a hyper-K\"ahler cone, which in turn defines a quaternionic K\"ahler manifold. Our results for the signature of the metric and the sign of the scalar curvature are consistent with what we know about the supergravity c-map.