On the parallel sum of positive operators, forms, and functionals

Abstract

The parallel sum A:B of two bounded positive linear operators A,B on a Hilbert space H is defined to be the positive operator having the quadratic form equation* ∈f\(A(x-y)\,|\,x-y)+(By\,|\,y)\,|\,y∈ H\ equation* for fixed x∈ H. The purpose of this paper is to provide a factorization of the parallel sum of the form JAPJA* where JA is the embedding operator of an auxiliary Hilbert space associated with A and B, and P 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 E into its topological anti-dual E', and of representable positive functionals on a *-algebra.