Add to ORKGLet H be a separable, infinite dimensional, complex Hilbert space. Let L(H) denote the algebra of all operators on H. A subspace M is invariant for the operator A if A MCM. A subalgebra A of L(H) is said to be transitive if the only invariant subspaces for A are {0} and H. A subalgebra W of L(H) is said to be reductive if every invariant subspace of W is reducing. The following problems are well known in operator theory. The Transitive Algebra Problem: If U is a transitive subalgebra of L(H), must U be strongly dense in L(H)? The Reductive Algebra Problem: If W is a reductive algebra, must W(,s), the closure of W in the strong operator topology, be a von Neumann algebra? In this paper we will focus on the above problems, and we will obtain ...
The purpose of this talk is twofold. In the first part (sections 1-4) I will briefly describe the no...
Abstract. In this paper we are interested in several conditions of operator algebras on Banach space...
We give an affirmative answer to the invariant subspace problem for densely defined closed operators...
Let H be a separable, infinite dimensional, complex Hilbert space. Let L(H) denote the algebra of al...
AbstractIn this paper, we consider the well-known transitive algebra problem and reductive algebra p...
Let H be an infinite dimensional separable complex Hilbert space, then (H) denotes the Banach algebr...
In this paper we study the transitive algebra question by considering the invariant subspace problem...
Let H be an infinite dimensional separable complex Hilbert space, then (H) denotes the Banach algebr...
AbstractIn this paper we study the transitive algebra question by considering the invariant subspace...
A Murray-von Neumann algebra Af (R) is the algebra of operators affiliated with a finite von Neumann...
AbstractIn this paper we study the transitive algebra question by considering the invariant subspace...
AbstractLet M be a finite von Neumann algebra acting on a Hilbert space H and A be a transitive alge...
The set of normalizers between von Neumann (or, more generally, reexive) algebras A and B, (that is...
In [1], J. Dyer, A. Pedersen and P. Porcelli announced that an affirmative answer to the invariant s...
This paper is concerned with a topology on the collection of invariant subspaces for a given operato...
The purpose of this talk is twofold. In the first part (sections 1-4) I will briefly describe the no...
Abstract. In this paper we are interested in several conditions of operator algebras on Banach space...
We give an affirmative answer to the invariant subspace problem for densely defined closed operators...
Let H be a separable, infinite dimensional, complex Hilbert space. Let L(H) denote the algebra of al...
AbstractIn this paper, we consider the well-known transitive algebra problem and reductive algebra p...
Let H be an infinite dimensional separable complex Hilbert space, then (H) denotes the Banach algebr...
In this paper we study the transitive algebra question by considering the invariant subspace problem...
Let H be an infinite dimensional separable complex Hilbert space, then (H) denotes the Banach algebr...
AbstractIn this paper we study the transitive algebra question by considering the invariant subspace...
A Murray-von Neumann algebra Af (R) is the algebra of operators affiliated with a finite von Neumann...
AbstractIn this paper we study the transitive algebra question by considering the invariant subspace...
AbstractLet M be a finite von Neumann algebra acting on a Hilbert space H and A be a transitive alge...
The set of normalizers between von Neumann (or, more generally, reexive) algebras A and B, (that is...
In [1], J. Dyer, A. Pedersen and P. Porcelli announced that an affirmative answer to the invariant s...
This paper is concerned with a topology on the collection of invariant subspaces for a given operato...
The purpose of this talk is twofold. In the first part (sections 1-4) I will briefly describe the no...
Abstract. In this paper we are interested in several conditions of operator algebras on Banach space...
We give an affirmative answer to the invariant subspace problem for densely defined closed operators...