On the homogeneous zero components of Leavitt algebras

Abstract

We prove that the zero component L(m,n)0 of a Leavitt algebra L(m,n) with respect to the canonical grading is a direct limit zL(m,n)0,z, where each algebra L(m,n)0,z is a free product of two Bergman algebras. For the special case m=1,n>1, one recovers the known result that the zero component L(1,n)0 is a direct limit of matrix algebras. Moreover, we show that L(m,n)0 has the IBN property.