Irrationality of degenerations of Fano varieties

Abstract

In this paper we investigate the degrees of irrationality of degenerations of ε-lc Fano varieties of arbitrary dimensions. We show that given a generically ε-lc klt Fano fibration X Z of dimension d over a smooth curve Z such that (X, t F) is lc for a positive real number t where F is the reduction of an irreducible central fibre of X over a closed point z∈ Z, then F admits a rational dominant map π F C to a smooth projective variety C with bounded degree of irrationality depending only on ε, d, t such that the general fibres of π are irreducible and rational. This proves the generically bounded case of a conjecture proposed by the first author and Loginov for log Fano fibrations of dimensions greater than three. One of the key ingredients in our proof is to modify the generically ε-lc klt Fano fibration X Z to a toroidal morphism of toroidal embeddings with bounded general fibres.