On the Galois-invariant part of the Weyl group of the Picard lattice of a K3 surface

Abstract

Let X denote a K3 surface over an arbitrary field k. Let ks denote a separable closure of k and let Xs denote the base change of X to ks. The action of the absolute Galois group Gal(ks/k) of k on Pic Xs respects the intersection pairing, which gives Pic Xs the structure of a lattice. Let O(Pic X) and O(Pic Xs) denote the group of isometries of Pic X and Pic Xs, respectively. Let RX denote the Galois invariant part of the Weyl group of O(Pic Xs). One can show that each element in RX can be restricted to an element of O(Pic X). The following question arises: Is the image of the restriction map RX O(Pic X) a normal subgroup of O(Pic X) for every K3 surface X? We show that the answer is negative by giving counterexamples over k=Q.