Operator Spaces and Residually Finite-Dimensional C*-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 classify the irreducible weight affine Lie algebra modules with finite-dimensional weight spaces on which the central element acts nontrivially. In particular, we show that any such module is a quotient of a generalized Verma module. The classification of such irreducible modules is reduced to th

Let F be a field of characteristic zero and let A be a finite dimensional algebra with involution ) over F. We study the asymptotic behavior of the sequence of n Ž . Ž . )-codimensions c A, ) of A and we show that Exp A, ) s lim c A, ) ' Ž . n n ª ϱ n Ž . exists and is an integer. We give an expli

## Abstract We consider a class of measures called autophage which was introduced and studied by Szekely for measures on the real line. We show that the autophage measures on finite‐dimensional vector spaces over real or **Q**~__p__~ are infinitely divisible without nontrivial idempotent factors an