A Functional Decomposition of Finite Bandwidth Reproducing Kernel Hilbert Spaces

Abstract

In this work, we consider "finite bandwidth" reproducing kernel Hilbert spaces which have orthonormal bases of the form fn(z)=zn Πj=1J ( 1 - anwj z ), where w1 ,w2, … wJ are distinct points on the circle T and \ an \ is a sequence of complex numbers with limit 1. We provide general conditions based on a matrix recursion that guarantee such spaces contain a functional multiple of the Hardy space. Then we apply this general method to obtain strong results for finite bandwidth spaces when n→ ∞ n (1-an)=p. In particular, we show that point evaluation can be extended boundedly to precisely J additional points on T and we obtain an explicit functional decomposition of these spaces for p>1/2 in analogy with a previous result in the tridiagonal case due to Adams and McGuire. We also prove that multiplication by z is a bounded operator on these spaces and that they contain the polynomials.