Interpolating functions for a family of domains related to $\mu$-synthesis

TL;DR

This paper characterizes a class of analytic interpolants mapping two-point data from the unit disc to a specific domain related to $ ilde{ ext{G}}_n$, connecting it to the $ ext{mu}$-synthesis problem in control theory.

Contribution

It describes a class of interpolating functions for a family of domains related to $ ext{mu}$-synthesis, expanding understanding of such mappings.

Findings

Characterization of interpolating functions for the domain $ ilde{ ext{G}}_n$

Connection established between $ ilde{ ext{G}}_n$ and $ ext{mu}$-synthesis

Conditions on parameters $eta_j$ for the interpolation class

Abstract

Assuming the existence of an analytic interpolant mapping a two-point data from the unit disc $\mathbb{D}$ to $\widetilde{\mathbb{G}}_n$, we describe a class of such interpolating functions where $$\widetilde{\mathbb{G}}_n := \{ (y_1,\dots, y_{n-1}, q)\in \mathbb{C}^n :\; q \in \mathbb{D},\; y_{j} = \beta_{j} + \bar{\beta}_{n-j} q,\; \beta_{j} \in \mathbb{C} \; \text{ and } \; |\beta_{j}|+ |\beta_{n-j}| < {n \choose j} \; \text{ for } \; j=1,\dots, n-1 \}.$$ We present the connection of $\widetilde{\mathbb{G}}_n$ with the $\mu$-synthesis problem.