Root data with group actions

Abstract

Suppose k is a field, G is a connected reductive algebraic k-group, T is a maximal k-torus in G, and is a finite group that acts on (G,T). From the above, one obtains a root datum on which Gal(k)× acts. Provided that preserves a positive system in , not necessarily invariant under Gal(k), we construct an inverse to this process. That is, given a root datum on which Gal(k)× acts appropriately, we show how to construct a pair (G,T), on which acts as above. Although the pair (G,T) and the action of are canonical only up to an equivalence relation, we construct a particular pair for which G is k-quasisplit and fixes a Gal(k)-stable pinning of G. Using these choices, we can define a notion of taking "-fixed points" at the level of equivalence classes, and this process is compatible with a general "restriction" process for root data with -action.