Sampling measures, Muckenhoupt Hamiltonians, and triangular factorization

Abstract

Let μ be an even measure on the real line R such that c1 ∫R|f|2\,dx ∫R|f|2\,dμ c2∫R|f|2\,dx for all functions f in the Paley-Wiener space PWa. We prove that μ is the spectral measure for the unique Hamiltonian H=(w&00&1w) on [0,a] generated by a weight w from the Muckenhoupt class A2[0,a]. As a consequence of this result, we construct Krein's orthogonal entire functions with respect to μ and prove that every positive, bounded, invertible Wiener-Hopf operator on [0,a] with real symbol admits triangular factorization.