Quadratures with super power convergence

Aleksandr A. Belov; Maxim A. Tintul; Valentin S. Khokhlachev

doi:10.22363/2658-4670-2023-31-2-128-138

Discrete and Continuous Models and Applied Computational Science (Dec 2023)

Quadratures with super power convergence

Aleksandr A. Belov,
Maxim A. Tintul,
Valentin S. Khokhlachev

Affiliations

Aleksandr A. Belov: ORCiD; M. V. Lomonosov Moscow State University
Maxim A. Tintul: ORCiD; M. V. Lomonosov Moscow State University
Valentin S. Khokhlachev: ORCiD; M. V. Lomonosov Moscow State University

DOI: https://doi.org/10.22363/2658-4670-2023-31-2-128-138
Journal volume & issue: Vol. 31, no. 2
pp. 128 – 138

Abstract

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The calculation of quadratures arises in many physical and technical applications. The replacement of integration variables is proposed, which dramatically increases the accuracy of the formula of averages. For infinitely smooth integrand functions, the convergence law becomes super power. It is significantly faster than the power law and is close to exponential one. For integrals with bounded smoothness, power convergence is realized with the maximum achievable order of accuracy.

Published in Discrete and Continuous Models and Applied Computational Science

ISSN: 2658-4670 (Print); 2658-7149 (Online)
Publisher: Peoples’ Friendship University of Russia (RUDN University)
Country of publisher: Russian Federation
LCC subjects: Science: Mathematics: Instruments and machines: Electronic computers. Computer science
Website: http://journals.rudn.ru/miph

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