In this paper we give essentially complete results concerning various algebraic and topological aspects of feedback stabilization. In particular, we give necessary and sufficient conditions for a given transfer function rnatrix to have a right-copripe or a left-coprime factorization, and exhibit a large class of transfer function matrices that have both. We give the most general set of feedback stability criteria available to date, and derive a characterization of all compensators that stabilize a given plant. We define what is meant by "proper" and "strictly proper" in an abstract setting and show that (i) every strictly proper plant can be stabilized by a proper coupensator, and (ii) every compensator that stabilizes a strictly proper plant must be proper. We then define a topology for unstable plants and coapensators, and show that it is the weakest topology in which feedback stability is a robust property.
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