AbstractThe Schur–Horn Convexity Theorem states that forain Rnp({U*diag(a)U:U∈U(n)})=conv(Sna),wherepdenotes the projection on the diagonal. In this paper we generalize this result to the setting of arbitrary separable Hilbert spaces. It turns out that the theorem still holds, if we take thel∞-closure on both sides. We will also give a description of the left-hand side for nondiagonalizable hermitian operators. In the last section we use this result to get an extension theorem for invariant closed convex subsets of the diagonal operators
AbstractLet 1 < p ⩽ 2 ⩽ q < ∞ and X be either a Banach lattice which is p-convex and q-concave or a ...
Dedicated to the memory of William Arveson(1934-2011) Abstract. A few years ago, Richard Kadison tho...
In this work we focus on the convex feasibility problem (CFP) in Hilbert space. A specific method in...
AbstractThe Schur–Horn Convexity Theorem states that forain Rnp({U*diag(a)U:U∈U(n)})=conv(Sna),where...
AbstractIn this paper we generalize the linear Kostant Convexity Theorem to Lie algebras of bounded ...
ix, 99 p.We characterize the diagonals of four classes of self-adjoint operators on infinite dimensi...
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...
AbstractWe prove that the open unit ball of any von Neumann algebra A is contained in the sequential...
Abstract. Given a finite set X ⊆ R we characterize the diagonals of self-adjoint operators with spec...
We investigate the Schur harmonic convexity for two classes of symmetric functions and the Schur mul...
It is shown that a separable Hilbert space can be covered by non-overlapping closed convex sets Ci w...
The notion of the shell of a Hilbert space operator, which is a useful generalization (proposed by W...
We prove that the Lehmer means Lp(x, y) = (xp+yp)(xp−1+yp−1)−1 are Schur harmonic convex (or concav...
Given a complex, separable Hilbert space H, we characterize those operators for which kP T(I − P)k =...
AbstractLet 1 < p ⩽ 2 ⩽ q < ∞ and X be either a Banach lattice which is p-convex and q-concave or a ...
Dedicated to the memory of William Arveson(1934-2011) Abstract. A few years ago, Richard Kadison tho...
In this work we focus on the convex feasibility problem (CFP) in Hilbert space. A specific method in...
AbstractThe Schur–Horn Convexity Theorem states that forain Rnp({U*diag(a)U:U∈U(n)})=conv(Sna),where...
AbstractIn this paper we generalize the linear Kostant Convexity Theorem to Lie algebras of bounded ...
ix, 99 p.We characterize the diagonals of four classes of self-adjoint operators on infinite dimensi...
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...
AbstractWe prove that the open unit ball of any von Neumann algebra A is contained in the sequential...
Abstract. Given a finite set X ⊆ R we characterize the diagonals of self-adjoint operators with spec...
We investigate the Schur harmonic convexity for two classes of symmetric functions and the Schur mul...
It is shown that a separable Hilbert space can be covered by non-overlapping closed convex sets Ci w...
The notion of the shell of a Hilbert space operator, which is a useful generalization (proposed by W...
We prove that the Lehmer means Lp(x, y) = (xp+yp)(xp−1+yp−1)−1 are Schur harmonic convex (or concav...
Given a complex, separable Hilbert space H, we characterize those operators for which kP T(I − P)k =...
AbstractLet 1 < p ⩽ 2 ⩽ q < ∞ and X be either a Banach lattice which is p-convex and q-concave or a ...
Dedicated to the memory of William Arveson(1934-2011) Abstract. A few years ago, Richard Kadison tho...
In this work we focus on the convex feasibility problem (CFP) in Hilbert space. A specific method in...