Algebras and groups defined by permutation relations of alternating type

Abstract

The class of finitely presented algebras over a field K with a set of generators a1,..., an and defined by homogeneous relations of the form a1a2... an =aσ (1) aσ (2) ... aσ (n), where σ runs through n, the alternating group, is considered. The associated group, defined by the same (group) presentation, is described. A description of the radical of the algebra is found. It turns out that the radical is a finitely generated ideal that is nilpotent and it is determined by a congruence on the underlying monoid, defined by the same presentation.