Add to ORKGIn this paper we review ongoing work on operators having norm-preserving extensions to every overspace. We call them Hahn–Banach operators. KEY WORDS: Hahn–Banach operators. 1
We completely characterize smoothness of bounded linear operators between infinite dimensional real ...
A basic sequence in a Banach space is called wide-(s) if it is bounded and dominates the summing bas...
AbstractA natural question about linear operators on the Hilbert–Hardy space is answered, motivated ...
A bounded linear operator T : H → H, where H is a Hilbert space, is said to be norm attaining if the...
A bounded linear operator T: H1 → H2, where H1, H2 are Hilbert spaces, is said to be norm attaining ...
This thesis presents and develops two tools which can be used to work with lower bounds of operators...
Abstract. In this paper we make a separable infinite dimensional Hilbert space into a matricially no...
AbstractThe classical Hahn-Banach Theorem states that any linear bounded functional defined on a lin...
Bishop and Phelps proved that the set of norm-attaining functionals on any Banach space is dense in ...
Let H-1 and H-2 be complex Hilbert spaces and T : H-1 -> H-2 be a bounded linear operator. We say T ...
Abstract. In this paper, we study maps φ of positive operators of Schatten p-classes (1 < p < ...
Let H be a complex Hilbert space and T: H → H be a bounded linear operator. Then T is said to be nor...
Approximating operators with norm attaining ones is a fundamental and classical problem in the funct...
textabstractWe consider one of the basic results of functional analysis, the classical theorem of Ha...
AbstractWe prove that every composition operator Cϕ on the Bloch space (modulo constant functions) a...
We completely characterize smoothness of bounded linear operators between infinite dimensional real ...
A basic sequence in a Banach space is called wide-(s) if it is bounded and dominates the summing bas...
AbstractA natural question about linear operators on the Hilbert–Hardy space is answered, motivated ...
A bounded linear operator T : H → H, where H is a Hilbert space, is said to be norm attaining if the...
A bounded linear operator T: H1 → H2, where H1, H2 are Hilbert spaces, is said to be norm attaining ...
This thesis presents and develops two tools which can be used to work with lower bounds of operators...
Abstract. In this paper we make a separable infinite dimensional Hilbert space into a matricially no...
AbstractThe classical Hahn-Banach Theorem states that any linear bounded functional defined on a lin...
Bishop and Phelps proved that the set of norm-attaining functionals on any Banach space is dense in ...
Let H-1 and H-2 be complex Hilbert spaces and T : H-1 -> H-2 be a bounded linear operator. We say T ...
Abstract. In this paper, we study maps φ of positive operators of Schatten p-classes (1 < p < ...
Let H be a complex Hilbert space and T: H → H be a bounded linear operator. Then T is said to be nor...
Approximating operators with norm attaining ones is a fundamental and classical problem in the funct...
textabstractWe consider one of the basic results of functional analysis, the classical theorem of Ha...
AbstractWe prove that every composition operator Cϕ on the Bloch space (modulo constant functions) a...
We completely characterize smoothness of bounded linear operators between infinite dimensional real ...
A basic sequence in a Banach space is called wide-(s) if it is bounded and dominates the summing bas...
AbstractA natural question about linear operators on the Hilbert–Hardy space is answered, motivated ...