Construction of groups with triality and their corresponding code loops

Abstract

We generalize the global construction of code loops introduced by Nagy, which is based on the connection between Moufang loops and groups with triality. This follows from the construction of a nilpotent group Gn of class 3 with triality and 2n generators, based on embeddings of Gn into direct products of copies of G3. In the finite case, where Gn is a group such that |Gn| = 24n+m with n 3 and m = 3 n 2 + 2 n 3, we prove that the corresponding Moufang loop is the free loop Fn with n generators in the variety generated by code loops. The result depends on a construction similar to that of Gn, namely, embedding Fn into direct products of copies of F3, the free code loop associated with G3.