Litcius/Paper detail

Singularities of linear systems and boundedness of Fano varieties

Caucher Birkar

2021Annals of Mathematics122 citationsDOIOpen Access PDF

Abstract

We study log canonical thresholds (also called global log canonicalthreshold or $\alpha$-invariant) of $\mathbb{R}$-linear systems. We prove existence of positive lower bounds in different settings, in particular, proving a conjecture of Ambro. We then show that the Borisov-Alexeev-Borisov conjecture holds; that is, given a natural number $d$ and a positive real number $\epsilon$, the set of Fano varieties of dimension $d$ with $\epsilon$-log canonical singularities forms a bounded family. This implies that birational automorphism groups of rationally connected varieties are Jordan which, in particular, answers a question of Serre. Next we show that if the log canonical threshold of the anti-canonical system of a Fano variety is at most one, then it is computed by some divisor, answering a question of Tian in this case.

Topics & Concepts

Fano planeMathematicsGravitational singularityBounded functionConjecturePure mathematicsInvariant (physics)Dimension (graph theory)Divisor (algebraic geometry)AutomorphismCombinatoricsDiscrete mathematicsMathematical analysisMathematical physicsAlgebraic Geometry and Number TheoryGeometry and complex manifoldsGeometric and Algebraic Topology