Thresholds, valuations, and K-stability

Let X be a normal complex projective variety with at worst kit singularities, and L a big line bundle on X. We use valuations to study the log canonical threshold of L, as well as another invariant, the stability threshold. The latter generalizes a notion by Fujita and Odaka, and can be used to characterize when a Q-Fano variety is K-semistable or uniformly K-stable. It can also be used to generalize volume bounds due to Fujita and Liu. The two thresholds can be written as infima of certain functionals on the space of valuations on X. When L is ample, we prove that these infima are attained. In the tonic case, tonic valuations achieve these infima, and we obtain simple expressions for the two thresholds in terms of the moment polytope of L. (C) 2020 Elsevier Inc. All rights reserved.