The Toeplitz corona problem for algebras of multipliers on a Nevanlinna-Pick space

Abstract

Suppose is an algebra of operators on a Hilbert space H and A1,..., An ∈ . If the row operator [A1,..., An] ∈ B(H(n),H) has a right inverse in B(H, H(n)), the Toeplitz corona problem for asks if a right inverse can be found with entries in . When H is a complete Nevanlinna-Pick space and is a weakly-closed algebra of multiplication operators on H, we show that under a stronger hypothesis, the corona problem for has a solution. When is the full multiplier algebra of H, the Toeplitz corona theorems of Arveson, Schubert and Ball-Trent-Vinnikov are obtained. A tangential interpolation result for these algebras is developed in order to solve the Toeplitz corona problem.