Invariant Subspaces and Nevanlinna–Pick Kernels

We give a new treatment of Quiggin's and McCullough's characterization of complete Nevanlinna Pick kernels. We show that a kernel has the matrix-valued Nevanlinna Pick property if and only if it has the vector-valued Nevanlinna Pick property. We give a representation of all complete Nevanlinna Pick

Let k be the reproducing kernel for a Hilbert space HðkÞ of analytic functions on B d , the open unit ball in C d , d51. k is called a complete NP kernel if k 0 1 and if 1 À 1=k l ðzÞ is positive definite on B d  B d . Let D be a separable Hilbert space, and consider HðkÞ D ffi Hðk; DÞ, and think o

Recently J. Agler studied the class S d of scalar-valued, analytic functions of d complex variables f for which f (T 1 , ..., T d ) has norm at most 1 for any collection of d commuting contractions (T 1 , ..., T d ) on a Hilbert space H. Among other results he obtained a characterization of such fun

In this paper, using the theory of Hilbert modules we study invariant subspaces of the Bergman spaces on bounded symmetric domains and quasi-invariant subspaces of the Segal-Bargmann spaces. We completely characterize small Hankel operators with finite rank on these spaces.