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Resumen: In this work, we analyze the numerical behavior of the classical Cauchy identity & sum;(lambda )s(lambda)(a(1),... , a(n))s(lambda)(x(1), ... , x(m)) = & prod;(n)(j=1) & prod;(m)(i=1) 1/1-a(j)x(i), by developing perturbation and running error analyses. We show that relative perturbations in the nodes x(i) and coefficients a(j) only induce small relative changes in the output provided some relative gaps are sufficiently large. We also propose an algorithm computing a posteriori relative error bound with low computational overhead. Finally, we derive truncation error bounds for the Schur expansion of the formula. Numerical experiments confirm the sharpness of the theoretical results and illustrate the effectiveness of the proposed bounds in practice.
Idioma: Inglés
DOI: 10.1007/s10092-026-00683-2
Año: 2026
Publicado en: CALCOLO 63, 1 (2026), [17 pp.]
ISSN: 0008-0624
Financiación: info:eu-repo/grantAgreement/ES/DGA/E41-23R
Financiación: info:eu-repo/grantAgreement/ES/MCIU/PID2022-138569NB-I00
Financiación: info:eu-repo/grantAgreement/ES/MCIU/RED2022-134176-T
Tipo y forma: Article (Published version)
Área (Departamento): Área Matemática Aplicada (Dpto. Matemática Aplicada)

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Exportado de SIDERAL (2026-02-24-14:47:44)


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Articles > Artículos por área > Matemática Aplicada