Abstract:
A conifold transition is a process which degenerates 2-cycles and
introduces new 3-cycles. We will investigate the web of Calabi–Yau
threefolds connected by conifold transitions. Early studies on conifold
transitions includes works of Reid and Friedman in the algebraic
geometry literature, and Candelas–de la Ossa and
Candelas–Green–Hubsch in the physics literature. A conifold transition
may connect a Kahler Calabi–Yau to a non-Kahler complex manifold with
trivial canonical bundle. There is a also a reverse conifold transition
which may produce a non-Kahler symplectic manifold. In this talk, we
will discuss the geometrization of these spaces by canonical metrics.