On the classification of inductive limits of sequences of semisimple finite-dimensional algebras

In this article, we will give a complete classification of simple C \* -algebras which can be written as inductive limits of algebras of the form A n ¼ È kn i¼1 M ½n;i ðCðX n;i ÞÞ, where X n;i are arbitrary variable one-dimensional compact metrizable spaces. The results unify and generalize the prev

We construct spectral sequences which provide a way to compute the cohomology theory that classifies extensions of graded connected Hopf algebras over a Ž . commutative ring as described by William M. Singer. Specifically, for A, B an abelian matched pair of graded connected R-Hopf algebras, we cons

We study the exponential growth of the codimensions c L of a finite-dimenn sional Lie algebra L over a field of characteristic zero. We show that if the n solvable radical of L is nilpotent then lim c L exists and is an integer.