Transitive operator algebras

We introduce the concept of a matricial Schur ideal, which serves as a dual object for operator algebras generated by a finite set of idempotents. Using matricial Schur ideals and some factorization theorems for tensor products of operator algebras, we are able to obtain matrix-valued interpolation

A 4-cycle algebra is a finite-dimensional digraph algebra (CSL algebra) whose reduced digraph is a 4-cycle. A rigid embedding between such algebras is a direct sum of certain nondegenerate multiplicity one star-extendible embeddings. A complete classification is obtained for the regular isomorphism

In a previous paper we showed how the main theorems characterizing operator algebras and operator modules, fit neatly into the framework of the ``noncommutative Shilov boundary,'' and more particularly via the left multiplier operator algebra of an operator space. As well as giving new characterizat

Let E be an operator algebra on a Hilbert space with finite-dimensional C g -algebra C g (E). A classification is given of the locally finite algebras A 0 = alg lim(A k , f k ) and the operator algebras A=K(A k , f k ) obtained as limits of direct sums of matrix algebras over E with respect to star-

When attempting to find sufficient conditions for a linear mapping to be a derivation, an obvious candidate is the concept of a local derivation. Local derivations on operator algebras have been investigated in recent papers of Kadison (J. Algebra 130 (1990), 494 509) and Larson and Sourour (Proc. S