Semilinear automorphisms of reductive algebraic groups

Abstract

Let G be a connected reductive algebraic group over a field k . We study the group of semilinear automorphisms Aut( G Spec k) consisting of algebraic automorphisms of G over automorphisms of k . We focus on the exact sequence 1 Aut G Aut ( G Spec k) AutG(k) 1 . When G is quasi-split, we show that AutG(k) is isomorphic to AutR(G)(k), where R(G) denotes the scheme of based root datum of G. Furthermore, the exact sequence 1 Aut G Aut ( G Spec k) AutG(k) 1 splits if and only if the exact sequence 1 Aut R(G) Aut (R(G) Spec k) AutR(G)(k) 1 splits. As a corollary, we get many examples of algebraic groups G over k whose group of abstract automorphisms does not decompose as the semidirect product of Aut G with AutG(k) . We also study the same questions for inner forms of SLn over a local field.