Existence of Hermitian-Yang-Mills metrics under conifold transitions

Abstract

We first study the degeneration of a sequence of Hermitian-Yang-Mills metrics with respect to a sequence of balanced metrics on a Calabi-Yau threefold X that degenerates to the balanced metric constructed by Fu, Li, and Yau on the complement of finitely many (-1,-1)-curves in X. Then under some assumptions we show the existence of Hermitian-Yang-Mills metrics on bundles over a family of threefolds Xt with trivial canonical bundles obtained by performing conifold transitions on X.