Connected algebraic groups acting on Fano fibrations over P1

Abstract

Let X/P1 be a Mori fibre space with general fibre of Picard rank at least two. We prove that there is a proper closed subset S⊂neq X, invariant by the connected component of the identity Aut(X) of the automorphism group of X, which is moreover the orbit of a section s and whose intersection with a fibre is an orbit of the subgroup of Aut(X) acting trivially on P1. Such result is a tool to describe equivariant birational maps from X/P1 to other Mori fibre spaces and therefore finds its applications in the study of connected algebraic subgroups of Aut(X). This represents a first reduction step towards a possible classification of maximal connected algebraic subgroups of the Cremona group of rank 4.