Two Forms of An Inverse Operator to the Generalized Bessel Potential

Akhmed Dzhabrailov; Yuri Luchko; Elina Shishkina

doi:10.3390/axioms10030232

Axioms (Sep 2021)

Two Forms of An Inverse Operator to the Generalized Bessel Potential

Akhmed Dzhabrailov,
Yuri Luchko,
Elina Shishkina

Affiliations

Akhmed Dzhabrailov: Department of Mathematical Analysis, Algebra and Geometry, Chechen State University, Sheripov Str. 32, 364024 Grozny, Russia
Yuri Luchko: Department of Mathematics, Physics, and Chemistry, Beuth Technical University of Applied Sciences Berlin, Luxemburger Str. 10, 13353 Berlin, Germany
Elina Shishkina: Department of Mathematical and Applied Analysis, Voronezh State University, Universitetskaya pl., 1, 394018 Voronezh, Russia

DOI: https://doi.org/10.3390/axioms10030232
Journal volume & issue: Vol. 10, no. 3
p. 232

Abstract

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In this paper, we treat a convolution-type operator called the generalized Bessel potential. Our main result is the derivation of two different forms of its inversion. The first inversion is provided in terms of an approximative inverse operator using the method of an improving multiplier. The second one employs the regularization technique for the divergent integrals in the form of the appropriate segments of the Taylor–Delsarte series.

Published in Axioms

ISSN: 2075-1680 (Online)
Publisher: MDPI AG
Country of publisher: Switzerland
LCC subjects: Science: Mathematics
Website: http://www.mdpi.com/journal/axioms

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