Abstract
We announce three results in the theory of Jacobi matrices and Schrodinger operators. First, we give necessary and sufficient conditions for a measure to be the spectral measure of a Schrodinger operator −d^2/dx^2+V(x) on L^2 (0,∞) with V ∈ L2(0,∞) and the boundary condition u(0) = 0. Second, we give necessary and sufficient conditions on the Jacobi parameters for the associated orthogonal polynomials to have Szegő asymptotics. Finally, we provide necessary and sufficient conditions on a measure to be the spectral measure of a Jacobi matrix with exponential decay at a given rate.
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