Ideal Extensions and Directly Infinite Algebras

Abstract

Directly infinite algebras, those algebras, E which have a pair of elements x and y where 1 = xy ≠ yx, are well known to have a sub-algebra isomorphic to M∞(K), the set of infinite × -indexed matrices which have only finitely many nonzero entries. When this sub-algebra is actually an ideal, we may analyze the algebra in terms of an extension of some algebra A by M∞(K), that is, a short exact sequence of K-algebras 0 M∞(K) E A 0. The present article characterizes all trivial (split) extensions of K[x,x-1] by M∞(K) by examining the extensions as sub-algebras of infinite matrix algebras. Furthermore, we construct an infinite family of pairwise non-isomorphic extensions \ Ti : i ≥ 0\, all of which can be written as an extension 0 M∞(K) Ti K[x,x-1] 0.