Weak products of complete Pick spaces

Abstract

Let H be the Drury-Arveson or Dirichlet space of the unit ball of Cd. The weak product H H of H is the collection of all functions h that can be written as h=Σn=1∞ fn gn, where Σn=1∞ \|fn\|\|gn\|<∞. We show that H H is contained in the Smirnov class of H, i.e. every function in H H is a quotient of two multipliers of H, where the function in the denominator can be chosen to be cyclic in H. As a consequence we show that the map N clos H H N establishes a 1-1 and onto correspondence between the multiplier invariant subspaces of H and of H H. The results hold for many weighted Besov spaces H in the unit ball of Cd provided the reproducing kernel has the complete Pick property. One of our main technical lemmas states that for weighted Besov spaces H that satisfy what we call the multiplier inclusion condition any bounded column multiplication operator H n=1∞ H induces a bounded row multiplication operator n=1∞ H H. For the Drury-Arveson space H2d this leads to an alternate proof of the characterization of interpolating sequences in terms of weak separation and Carleson measure conditions.