Alternative algebras with the hyperbolic property

Abstract

We investigate the structure of an alternative finite dimensional -algebra A subject to the condition that for a -order ⊂ A, and thus for every -order of A, the loop of units of () does not contain a free abelian subgroup of rank two. In particular, we prove that the radical of such an algebra associates with the whole algebra. We also classify RA-loops L for which ZL has this property. The classification for group rings is still an open problem.