On connectedness of non-klt loci of singularities of pairs
Abstract
We study the non-klt locus of singularities of pairs. We show that given a pair (X,B) and a projective morphism X Z with connected fibres such that -(KX+B) is nef over Z, the non-klt locus of (X,B) has at most two connected components near each fibre of X Z. This was conjectured by Hacon and Han. In a different direction we answer a question of Mark Gross on connectedness of the non-klt loci of certain pairs. This is motivated by constructions in Mirror Symmetry.
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