Add to ORKGIn [1], J. Dyer, A. Pedersen and P. Porcelli announced that an affirmative answer to the invariant subspace problem would imply that every reductive operator is normal. Their argument, outlined in [1], provides a striking application of direct integral theory. Moreover, this method leads to a general decomposition theory for reductive algebras which in turn illuminates the close relationship between the transitive and reductive algebra problems
The notion of an invariant subspace is fundamental to the subject of operator theory. Given an opera...
AbstractLet A be a semifinite von Neumann algebra, with countably decomposable center, on the Hilber...
The notion of an invariant subspace is fundamental to the subject of operator theory. Given an opera...
In [1], J. Dyer, A. Pedersen and P. Porcelli announced that an affirmative answer to the invariant s...
In [1], J. Dyer, A. Pedersen and P. Porcelli announced that an affirmative answer to the invariant s...
In [1], J. Dyer, A. Pedersen and P. Porcelli announced that an affirmative answer to the invariant s...
In [1], J. Dyer, A. Pedersen and P. Porcelli announced that an affirmative answer to the invariant s...
In [1], J. Dyer, A. Pedersen and P. Porcelli announced that an affirmative answer to the invariant s...
In [1], J. Dyer, A. Pedersen and P. Porcelli announced that an affirmative answer to the invariant s...
In [1], J. Dyer, A. Pedersen and P. Porcelli announced that an affirmative answer to the invariant s...
Let H be a separable, infinite dimensional, complex Hilbert space. Let L(H) denote the algebra of al...
Let H be a separable, infinite dimensional, complex Hilbert space. Let L(H) denote the algebra of al...
Azoff, Edward and Gilfeather, Frank, "Measurable Choice and the Invariant Subspace Problem &quo...
The notion of an invariant subspace is fundamental to the subject of operator theory. Given an opera...
© 2013, Springer Science+Business Media New York. New results showing connections between structural...
The notion of an invariant subspace is fundamental to the subject of operator theory. Given an opera...
AbstractLet A be a semifinite von Neumann algebra, with countably decomposable center, on the Hilber...
The notion of an invariant subspace is fundamental to the subject of operator theory. Given an opera...
In [1], J. Dyer, A. Pedersen and P. Porcelli announced that an affirmative answer to the invariant s...
In [1], J. Dyer, A. Pedersen and P. Porcelli announced that an affirmative answer to the invariant s...
In [1], J. Dyer, A. Pedersen and P. Porcelli announced that an affirmative answer to the invariant s...
In [1], J. Dyer, A. Pedersen and P. Porcelli announced that an affirmative answer to the invariant s...
In [1], J. Dyer, A. Pedersen and P. Porcelli announced that an affirmative answer to the invariant s...
In [1], J. Dyer, A. Pedersen and P. Porcelli announced that an affirmative answer to the invariant s...
In [1], J. Dyer, A. Pedersen and P. Porcelli announced that an affirmative answer to the invariant s...
Let H be a separable, infinite dimensional, complex Hilbert space. Let L(H) denote the algebra of al...
Let H be a separable, infinite dimensional, complex Hilbert space. Let L(H) denote the algebra of al...
Azoff, Edward and Gilfeather, Frank, "Measurable Choice and the Invariant Subspace Problem &quo...
The notion of an invariant subspace is fundamental to the subject of operator theory. Given an opera...
© 2013, Springer Science+Business Media New York. New results showing connections between structural...
The notion of an invariant subspace is fundamental to the subject of operator theory. Given an opera...
AbstractLet A be a semifinite von Neumann algebra, with countably decomposable center, on the Hilber...
The notion of an invariant subspace is fundamental to the subject of operator theory. Given an opera...