The truncated univariate rational moment problem

Abstract

Given a closed subset K in R, the rational K-truncated moment problem (K-RTMP) asks to characterize the existence of a positive Borel measure μ, supported on K, such that a linear functional L, defined on all rational functions of the form fq, where q is a fixed polynomial with all real zeros of even order and f is any real polynomial of degree at most 2k, is an integration with respect to μ. The case of a compact set K was solved by Chandler in 1994, but there is no argument that ensures that μ vanishes on all real zeros of q. An obvious necessary condition for the solvability of the K-RTMP is that L is nonnegative on every f satisfying f|K≥ 0. If L is strictly positive on every 0≠ f|K≥ 0, we add the missing argument from Chandler's solution and also bound the number of atoms in a minimal representing measure. We show by an example that nonnegativity of L is not sufficient and add the missing conditions to the solution. We also solve the K-RTMP for unbounded K and derive the solutions to the strong truncated Hamburger moment problem and the truncated moment problem on the unit circle as special cases.

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