English

The truncated univariate rational moment problem

Functional Analysis 2024-11-19 v1

Abstract

Given a closed subset KK in R\mathbb{R}, the rational KK-truncated moment problem (KK-RTMP) asks to characterize the existence of a positive Borel measure μ\mu, supported on KK, such that a linear functional L\mathcal{L}, defined on all rational functions of the form fq\frac{f}{q}, where qq is a fixed polynomial with all real zeros of even order and ff is any real polynomial of degree at most 2k2k, is an integration with respect to μ\mu. The case of a compact set KK was solved by Chandler in 1994, but there is no argument that ensures that μ\mu vanishes on all real zeros of qq. An obvious necessary condition for the solvability of the KK-RTMP is that L\mathcal{L} is nonnegative on every ff satisfying fK0f|_{K}\geq 0. If L\mathcal{L} is strictly positive on every 0fK00\neq f|_{K}\geq 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\mathcal{L} is not sufficient and add the missing conditions to the solution. We also solve the KK-RTMP for unbounded KK and derive the solutions to the strong truncated Hamburger moment problem and the truncated moment problem on the unit circle as special cases.

Cite

@article{arxiv.2411.11480,
  title  = {The truncated univariate rational moment problem},
  author = {Rajkamal Nailwal and Aljaž Zalar},
  journal= {arXiv preprint arXiv:2411.11480},
  year   = {2024}
}

Comments

18 pages

R2 v1 2026-06-28T20:03:24.243Z