A geometric characterization of toric singularities

Abstract

Given a projective contraction π X→ Z and a log canonical pair (X, B) such that -(KX+B) is nef over a neighborhood of a closed point z∈ Z, one can define an invariant, the complexity of (X, B) over z ∈ Z, comparing the dimension of X and the relative Picard number of X/Z with the sum of the coefficients of those components of B intersecting the fibre over z. We prove that the complexity of (X,B) over z∈ Z is non-negative and that when it is zero then (X, B ) → Z is formally isomorphic to a morphism of toric varieties around z∈ Z. In particular, considering the case when π is the identity morphism, we get a geometric characterization of singularities that are formally isomorphic to toric singularities. This gives a positive answer to a conjecture due to Shokurov.