On the parallel sum of positive operators, forms, and functionals
Functional Analysis
2015-01-09 v1
Abstract
The parallel sum of two bounded positive linear operators on a Hilbert space is defined to be the positive operator having the quadratic form \begin{equation*} \inf\{(A(x-y)\,|\,x-y)+(By\,|\,y)\,|\,y\in H\} \end{equation*} for fixed . The purpose of this paper is to provide a factorization of the parallel sum of the form where is the embedding operator of an auxiliary Hilbert space associated with and , and is an orthogonal projection onto a certain linear subspace of that Hilbert space. We give similar factorizations of the parallel sum of nonnegative Hermitian forms, positive operators of a complex Banach space into its topological anti-dual , and of representable positive functionals on a -algebra.
Cite
@article{arxiv.1501.01922,
title = {On the parallel sum of positive operators, forms, and functionals},
author = {Zsigmond Tarcsay},
journal= {arXiv preprint arXiv:1501.01922},
year = {2015}
}
Comments
14 pages