On the classification of rational four-dimensional unital division algebras

Abstract

In a paper by E. Dieterich 2017, the category C(k) of four-dimensional unital division algebras, whose right nucleus is non-trivial and whose automorphism group contains Klein's four group V, is studied over a general ground field k with char\,k≠ 2. In particular, the objects in C(k) are exhaustively constructed from parameters in k3 and explicit isomorphism conditions for the constructed objects are found in terms of these parameters. In this paper, we specialize to the case k=Q and present results towards a classification of C(Q). In particular, for each field with [:k]=2 we present explicity a two-parameter family of pairwise non-isomorphic non-associative objects in C(Q) that admit as a subfield and we provide a method for classifying the full subcategory of central skew fields admitting as a subfield and kV-submodule. We also classify the subcategory of C(Q) of all four-dimensional Galois extensions of Q with Galois group V that admit as a subfield.