Subgroups of Spin(7) or SO(7) with each element conjugate to some element of G2, and applications to automorphic forms

Abstract

As is well-known, the compact groups Spin(7) and SO(7) both have a single conjugacy class of compact subgroups of exceptional type G2. We first show that if H is a subgroup of Spin(7), and if each element of H is conjugate to some element of G2, then H itself is conjugate to a subgroup of G2. The analogous statement for SO(7) turns out be false, and our main result is a classification of all the exceptions. They are the following groups, embedded in each case in SO(7) in a very specific way: GL2(Z/3Z), SL2(Z/3Z), Z/4Z x Z/2Z, as well as the nonabelian subgroups of GO2(C) with compact closure, similitude factors group -1,1, and which are not isomorphic to the dihedral group of order 8. More generally, we consider the analogous problems in which the Euclidean space is replaced by a quadratic space of dimension 7 over an arbitrary field. This type of questions naturally arises in some formulation of a converse statement of Langlands' global functoriality conjecture, to which the results above have thus some applications. Moreover, we give necessary and sufficient local conditions on a cuspidal algebraic regular automorphic representation of GL7 over a totally real number field so that its associated -adic Galois representations can be conjugate into G2(Q).