The main focus of this dissertation is on exploring methods to characterize the diagonals of projections in matrix algebras over von Neumann algebras. This may be viewed as a non-commutative version of the generalized Pythagorean theorem and its converse (Carpenter\u27s Theorem) studied by R. Kadison. A combinatorial lemma, which characterizes the permutation polytope of a vector in $\mathbb{R}^n$ in terms of majorization, plays an important role in a proof of the Schur-Horn theorem. The Pythagorean theorem and its converse follow from this as a special case. In the quest for finding a non-commutative version of the lemma alluded to above, the notion of C*-convexity looks promising as the correct generalization for convexity. We make genera...
© 2015, Springer Science+Business Media New York. We obtain new necessary and sufficient commutation...
We prove a variety of results describing the diagonals of tuples of commuting hermitian operators in...
Dedicated to the memory of William Arveson(1934-2011) Abstract. A few years ago, Richard Kadison tho...
The main focus of this dissertation is on exploring methods to characterize the diagonals of project...
The main focus of this dissertation is on exploring methods to characterize the diagonals of project...
It is proved that every skew-Hermitian element of any properly infinite von Neumann algebra can be r...
AbstractThis paper establishes a type decomposition theory for embeddings of a von Neumann algebra A...
In this dissertation, we defined a new class of non selfadjoint operator algebras---Kadison-Singer a...
Some well-known results for matrices over a principal ideal domain are generalized to matrices over ...
Abstract: Some well known results for matrices over a principal ideal domain are generalized to matr...
AbstractNon-commutative Lp-spaces, 1 < p < ∞, associated with a von Neumann algebra are considered. ...
We find new necessary and sufficient conditions for the commutativity of projections in terms of ope...
AbstractThe Schur–Horn Convexity Theorem states that forain Rnp({U*diag(a)U:U∈U(n)})=conv(Sna),where...
ix, 99 p.We characterize the diagonals of four classes of self-adjoint operators on infinite dimensi...
The structure of projections in the matrix algebra over II1 factor is studied, and it is used to con...
© 2015, Springer Science+Business Media New York. We obtain new necessary and sufficient commutation...
We prove a variety of results describing the diagonals of tuples of commuting hermitian operators in...
Dedicated to the memory of William Arveson(1934-2011) Abstract. A few years ago, Richard Kadison tho...
The main focus of this dissertation is on exploring methods to characterize the diagonals of project...
The main focus of this dissertation is on exploring methods to characterize the diagonals of project...
It is proved that every skew-Hermitian element of any properly infinite von Neumann algebra can be r...
AbstractThis paper establishes a type decomposition theory for embeddings of a von Neumann algebra A...
In this dissertation, we defined a new class of non selfadjoint operator algebras---Kadison-Singer a...
Some well-known results for matrices over a principal ideal domain are generalized to matrices over ...
Abstract: Some well known results for matrices over a principal ideal domain are generalized to matr...
AbstractNon-commutative Lp-spaces, 1 < p < ∞, associated with a von Neumann algebra are considered. ...
We find new necessary and sufficient conditions for the commutativity of projections in terms of ope...
AbstractThe Schur–Horn Convexity Theorem states that forain Rnp({U*diag(a)U:U∈U(n)})=conv(Sna),where...
ix, 99 p.We characterize the diagonals of four classes of self-adjoint operators on infinite dimensi...
The structure of projections in the matrix algebra over II1 factor is studied, and it is used to con...
© 2015, Springer Science+Business Media New York. We obtain new necessary and sufficient commutation...
We prove a variety of results describing the diagonals of tuples of commuting hermitian operators in...
Dedicated to the memory of William Arveson(1934-2011) Abstract. A few years ago, Richard Kadison tho...