Banach algebras of symmetric functions on the polydisc

Abstract

Let D=\z∈ C:|z|<1\ and for an integer d≥ 1, let Sd denote the symmetric group, consisting of of all permutations of the set \1,·s, d\. A function f:Dd→ C is symmetric if f(z1,·s, zd)=f(zσ(1),·s, zσ (d)) for all σ ∈ Sd and all (z1,·s, zd)∈ Dd. The polydisc algebra A(Dd) is the Banach algebra of all holomorphic functions f on the polydisc Dd that can be continuously extended to the closure of the polydisc in Cd, with pointwise operations and the supremum norm (given by \|f\|∞:=z ∈ Dd |f(z)|). Let Asym(Dd) be the Banach subalgebra of A(Dd) consisting of all symmetric functions in the polydisc algebra. Algebraic-analytic properties of Asym(Dd) are investigated. In particular, the following results are shown: the corona theorem, description of the maximal ideal space and its contractibility, Hermiteness, projective-freeness, and non-coherence.