The Corona theorem and stable rank for the algebra +BH∞

Abstract

Let B be a Blaschke product. We prove in several different ways the corona theorem for the algebra H∞B:=+BH∞. That is, we show the equivalence of the classical corona condition on data f1, ..., fn ∈ H∞B: \[ ∀ z ∈ , Σk=1n |fk(z)| ≥ δ >0, \] and the solvability of the Bezout equation for g1, ..., gn ∈ H∞B: \[ ∀ z∈ , Σk=1n gk (z)fk(z)=1. \] Estimates on solutions to the Bezout equation are also obtained. We also show that the Bass stable rank of H∞B is 1. Let A()B be the subalgebra of all elements from H∞B having a continuous extension to the closed unit disk . Analogous results are obtained also for A()B.