On Clifford theory with Galois action

Abstract

Let G be a finite group, N a normal subgroup of G and θ∈ IrrN. Let F be a subfield of the complex numbers and assume that the Galois orbit of θ over F is invariant in G. We show that there is another triple (G1,N1,θ1) of the same form, such that the character theories of G over θ and of G1 over θ1 are essentially "the same" over the field F and such that the following holds: G1 has a cyclic normal subgroup C contained in N1, such that θ1=λN1 for some linear character λ of C, and such that N1/C is isomorphic to the (abelian) Galois group of the field extension F(λ)/F(θ1). More precisely, "the same" means that both triples yield the same element of the Brauer-Clifford group BrCliff(G,F(θ)) defined by A. Turull.