A Schwarz lemma for the pentablock
Abstract
In this paper we prove a Schwarz lemma for the pentablock. The set \[ P=\(a21, tr \ A, A) : A=[aij]i,j=12 ∈ B2× 2\ \] where B2× 2 denotes the open unit ball in the space of 2× 2 complex matrices, is called the pentablock. The pentablock is a bounded nonconvex domain in C3 which arises naturally in connection with a certain problem of μ-synthesis. We develop a concrete structure theory for the rational maps from the unit disc D to the closed pentablock P that map the unit circle T to the distinguished boundary bP of P. Such maps are called rational P-inner functions. We give relations between penta-inner functions and inner functions from D to the symmetrized bidisc. We describe the construction of rational penta-inner functions x = (a, s, p) : D → P of prescribed degree from the zeroes of a, s and s2-4p. The proof of this theorem is constructive: it gives an algorithm for the construction of a family of such functions x subject to the computation of Fej\'er-Riesz factorizations of certain non-negative trigonometric functions on the circle. We use properties and the construction of rational P-inner functions to prove a Schwarz lemma for the pentablock.
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