The complex geomety of a domain related to μ-synthesis

Abstract

We describe the basic complex geometry and function theory of the pentablock P, which is the bounded domain in C3 given by \[ P= \(a21, tr A, A): A= bmatrix aijbmatrixi,j=12 ∈ B\ \] where B denotes the open unit ball in the space of 2× 2 complex matrices. We prove several characterizations of the domain. We describe its distinguished boundary and exhibit a 4-parameter group of automorphisms of P. We show that P is intimately connected with the problem of μ-synthesis for a certain cost function μ on the space of 2× 2 matrices defined in connection with robust stabilization by control engineers. We demonstrate connections between the function theories of P and B. We show that P is polynomially convex and starlike.