Function Theory and necessary conditions for a Schwarz lemma related to μ-Synthesis Domains

Abstract

A subset of C7 (respectively, of C5) associated with the structured singular value μE, defined on 3 × 3 matrices, is denoted by GE(3;3;1,1,1) (respectively, by GE(3;2;1,2)). In control engineering, the structured singular value μE plays a crucial role in analyzing the robustness and performance of linear feedback systems. We characterize the domain GE(3;3;1,1,1) and its closure E(3;3;1,1,1), and employ realization formulas to describe both. The domain GE(3;3;1,1,1) and its closure are neither circular nor convex; however, they are simply connected. We provide an alternative proof of the polynomial and linear convexity of E(3;3;1,1,1). Furthermore, we establish necessary conditions for a Schwarz lemma on the domains GE(3;3;1,1,1) and GE(3;2;1,2), and describe the relationships between these two domains as well as between their closed boundaries.

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