Classification and Properties of Hyperconifold Singularities and Transitions

Abstract

This paper is a detailed study of a class of isolated Gorenstein threefold singularities, called hyperconifolds, that are finite quotients of the conifold. First, it is shown that hyperconifold singularities arise naturally in limits of smooth, compact Calabi--Yau threefolds (in particular), when the group action on the covering space develops a fixed point. The Zn-hyperconifolds---those for which the quotient group is cyclic---are classified, demonstrating a one-to-one correspondence between these singularities and three-dimensional lens spaces L(n,k), which occur as the vanishing cycles. The classification is constructive, and leads to a simple proof that a Zn-hyperconifold is mirror to an n-nodal variety. It is then argued that all factorial Zn-hyperconifolds have crepant, projective resolutions, and this gives rise to transitions between smooth compact Calabi--Yau threefolds, which are mirror to certain conifold transitions. Formulae are derived for the change in both fundamental group and Hodge numbers under such hyperconifold transitions. Finally, a number of explicit examples are given, to illustrate how to construct new Calabi--Yau manifolds using hyperconifold transitions, and also to highlight the differences which can occur when these singularities occur in non-factorial varieties.