Add to ORKGA bounded operator A on a Hilbert space H was positive. These operators were symmetric, and as such constitute a natural generalization of nonnegative real diagonal matrices. The following result is thus both well known and not surprising: A positive operator has a unique positive square root (under operator composition)
AbstractThe theory of positive (=nonnegative) finite square matrices continues, three quarters of a ...
We revise Krein's extension theory of positive symmetric operators. Our approach using factorization...
Here are some references and telegraphic notes on completely positive maps of operator algebras. No ...
AbstractNatural conditions are imposed on spectra of products and sums of operators. This results in...
AbstractWe relate several results on positive matrices due to Soittola (1976), Handelman 1981, 1987)...
AbstractLet H and K be bounded positive operators on a Hilbert space, and assume that H is nonsingul...
It is shown that a positive (bounded linear) operator on a Hilbert space with trivial kernel is unit...
One of the proofs of the spectral theorem for bounded operators begins by proving that a bounded, po...
Natural conditions are imposed on spectra of products and sums of operators. This results in charact...
AbstractLet H and K be bounded positive operators on a Hilbert space, and assume that H is nonsingul...
AbstractWe establish new connections between the range of a positive semidefinite matrix and its exp...
AbstractLet T be an invertible positive operator on a Banach lattice E such that the number 0 belong...
This small chapter is part of my book "an operator theory problem book", published in 2018
We improve known perturbation results for self-adjoint operators in Hilbert spaces and prove spectra...
summary:An operator with infinite dimensional kernel is positive iff it is a positive scalar times a...
AbstractThe theory of positive (=nonnegative) finite square matrices continues, three quarters of a ...
We revise Krein's extension theory of positive symmetric operators. Our approach using factorization...
Here are some references and telegraphic notes on completely positive maps of operator algebras. No ...
AbstractNatural conditions are imposed on spectra of products and sums of operators. This results in...
AbstractWe relate several results on positive matrices due to Soittola (1976), Handelman 1981, 1987)...
AbstractLet H and K be bounded positive operators on a Hilbert space, and assume that H is nonsingul...
It is shown that a positive (bounded linear) operator on a Hilbert space with trivial kernel is unit...
One of the proofs of the spectral theorem for bounded operators begins by proving that a bounded, po...
Natural conditions are imposed on spectra of products and sums of operators. This results in charact...
AbstractLet H and K be bounded positive operators on a Hilbert space, and assume that H is nonsingul...
AbstractWe establish new connections between the range of a positive semidefinite matrix and its exp...
AbstractLet T be an invertible positive operator on a Banach lattice E such that the number 0 belong...
This small chapter is part of my book "an operator theory problem book", published in 2018
We improve known perturbation results for self-adjoint operators in Hilbert spaces and prove spectra...
summary:An operator with infinite dimensional kernel is positive iff it is a positive scalar times a...
AbstractThe theory of positive (=nonnegative) finite square matrices continues, three quarters of a ...
We revise Krein's extension theory of positive symmetric operators. Our approach using factorization...
Here are some references and telegraphic notes on completely positive maps of operator algebras. No ...