Borel subgroups of the plane Cremona group

Abstract

It is well known that all Borel subgroups of a linear algebraic group are conjugate. This result also holds for the automorphism group Aut ( A2) of the affine plane BerestEshmatovEshmatov2016 (see also FurterPoloni2018). In this paper, we describe all Borel subgroups of the complex Cremona group Bir( P2) up to conjugation, proving in particular that they are not necessarily conjugate. More precisely, we prove that Bir( P2) admits Borel subgroups of any rank r ∈ \ 0,1,2 \ and that all Borel subgroups of rank r ∈ \ 1,2 \ are conjugate. In rank 0, there is a 1-1 correspondence between conjugacy classes of Borel subgroups of rank 0 and hyperelliptic curves of genus g ≥ 1. Hence, the conjugacy class of a rank 0 Borel subgroup admits two invariants: a discrete one, the genus g, and a continuous one, corresponding to the coarse moduli space of hyperelliptic curves of genus g. This latter space is of dimension 2g-1.