Duality and operator algebras II: operator algebras as Banach algebras

He also extended the notion of jumping numbers and proved that when a Cartier algebra is gauge bounded then the set of jumping numbers of the corresponding test modules is discrete

Abstract: We investigate ergodic properties of Markov semigroups in von Neumann algebras with the help of the notion of constrictor, which expresses the idea of close- ness of

It is shown that for a wide class of spaces, namely the locally compact σ-compact ones, the Riesz decomposition on the monoid forces the (covering) dimension of the space to be

In this paper we describe the Cuntz semigroup of continuous fields of C ∗ - algebras over one dimensional spaces whose fibers have stable rank one and trivial K 1 for each

While the preceding papers mostly considered abstract properties of algebras of quotients, our main objective is to compute Q m (L) for some Lie algebras L. Specifically, we

One can consider a Jacobi manifold as a generalized phase-space and the Lie algebra of infinitesimal automorphisms as the algebra of symmetries of this phase-space.. Then the

(ii) => (iii) Since isotopies preserve left division, we may assurne that A has a left unit, and then the subspace P of bounded linear operators en the normed space of A given by

We have seen that modifications of the procedure to compute the Casimir operators of semidirect products s − → ⊕ R w(n) using quadratic operators in the enveloping algebra can