On the geometry of the generalized partial realization problem

In this paper we present a novel way of constructing generalized state space representations [E, A, B, C, D] of interpolants matching tangential interpolation data. The Loewner and shifted Loewner matrices are the key tools in this approach.

## Abstract We study the set __S__ = {(__a, b__) ∈ __A__ × __A__ : __aba__ = __a, bab__ = __b__} which pairs the relatively regular elements of a Banach algebra __A__ with their pseudoinverses, and prove that it is an analytic submanifold of __A × A__. If __A__ is a C\*‐algebra, inside __S__ lies a

We examine the notion of symmetry in quantum field theory from a fundamental representation theoretic point of view. This leads us to a generalization expressed in terms of quantum groups and braided categories. It also unifies the conventional concept of symmetry with that of exchange statistics an