Algebras generated by volterra operators

It is proved that for any vector space W, any set of parafermion-like vertex operators on W in a certain canonical way generates a generalized vertex algebra in the sense of Dong and Lepowsky with W as a natural module. As an application, generalized vertex algebras are constructed from the Lepowsky

An operator system X, such that X\*\* is a C\*-algebra and such that the canonical embedding of X in X\*\* is a unital complete isometry, is called a C\*-system. If A is a unital C\*-algebra and L is a closed left ideal of A, then AÂ(L+L\*) has a natural operator-system structure relative to which i

The topic of the present paper is concrete Banach and C\*-algebras which are generated by a finite number of idempotents. Our first result is that, for each finitely generated Banach algebra A, there is a number n 0 so that the algebra A n\_n of all n\_n matrices with entries in A is generated by th

We prove that every MV-e ect algebra M is, as an e ect algebra, a homomorphic image of its R-generated Boolean algebra. We characterize central elements of M in terms of the constructed homomorphism.