Corrigendum on the proof of completeness for exceptional Hermite polynomials

Exceptional orthogonal polynomials are complete families of orthogonal polynomials that arise as eigenfunctions of a Sturm Liouville problem. Antonio Durán discovered a gap in the original proof of completeness for exceptional Hermite polynomials, that has propagated to analogous results for other exceptional families. In this paper we provide an alternative proof that follows essentially the same arguments, but provides a direct proof of the key lemma on which the completeness proof is based. This direct proof makes use of the theory of trivial monodromy potentials developed by Duistermaat and Grünbaum and Oblomkov

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Attribution-NonCommercial-NoDerivatives 4.0 International

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IE School of Science & Technology

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Gómez-Ullate, D., Grandati, Y., & Milson, R. (2020). Corrigendum on the proof of completeness for exceptional Hermite polynomials. Journal of Approximation Theory, 253, 105350. https://doi.org/10.1016/j.jat.2019.105350

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Corrigendum on the proof of completeness for exceptional Hermite polynomials

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Publication: Corrigendum on the proof of completeness for exceptional Hermite polynomials

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Date

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Journal Title

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Volume Title

Publisher

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Publication:
Corrigendum on the proof of completeness for exceptional Hermite polynomials