On the fundamental groups of commutative algebraic groups

Abstract

Consider the abelian category C of commutative group schemes of finite type over a field k, its full subcategory F of finite group schemes, and the associated pro category Pro( C) (resp. Pro( F)) of pro-algebraic (resp. profinite) group schemes. When k is perfect, we show that the profinite fundamental group 1 : Pro( C) Pro( F) is left exact and commutes with base change under algebraic field extensions; as a consequence, the higher profinite homotopy functors i vanish for i ≥ 2. Along the way, we describe the indecomposable projective objects of Pro( C) over an arbitrary field k.