The Corona Theorem for the Drury-Arveson Hardy space and other holomorphic Besov-Sobolev spaces on the unit ball in Cn

Abstract

We prove that the multiplier algebra of the Drury-Arveson Hardy space Hn2 on the unit ball in Cn has no corona in its maximal ideal space, thus generalizing the famous Corona Theorem of L. Carleson to higher dimensions. This result is obtained as a corollary of the Toeplitz corona theorem and a new Banach space result: the Besov-Sobolev space Bpσ has the "baby corona property" for all σ ≥ 0 and 1<p<∞ . In addition we obtain infinite generator and semi-infinite matrix versions of these theorems.