Interpolation and duality in algebras of multipliers on the ball

Abstract

We study the multiplier algebras A(H) obtained as the closure of the polynomials on certain reproducing kernel Hilbert spaces H on the ball Bd of Cd. Our results apply, in particular, to the Drury-Arveson space, the Dirichlet space and the Hardy space on the ball. We first obtain a complete description of the dual and second dual spaces of A( H) in terms of the complementary bands of Henkin and totally singular measures for Mult(H). This is applied to obtain several definitive results in interpolation. In particular, we establish a sharp peak interpolation result for compact Mult(H)-totally null sets as well as a Pick and peak interpolation theorem. Conversely, we show that a mere interpolation set is Mult(H)-totally null.