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Ufa Mathematical Journal, 2023, Volume 15, Issue 4, Pages 62–75
DOI: https://doi.org/10.13108/2023-15-4-62
(Mi ufa676)
 

This article is cited in 1 scientific paper (total in 1 paper)

On invertibility of Duhamel operator in spaces of ultradifferentiable functions

O. A. Ivanovaa, S. N. Melikhovba

a South Federal University, Institute of Mathematics, Mechaniscs and Computer Sciences named after I.I. Vorovich, Milchakova str. 8a, 344090, Rostov-on-Don, Russia
b South Mathematical Institute, Vladikavkaz Scientific Center, Russian Academy of Sciences, Vatutin str. 53, 362025, Vladikavkaz, Russia
References:
Abstract: Let $\Delta$ be a non-point segment or an (open) interval on the real line containing the point $0$. In the space of entire functions realized by the Fourier-Laplace transform of the dual space to the space of ultradifferentiable or of all infinitely differentiable functions on $\Delta$, we study the operators from the commutator subgroup of the one-dimensional perturbation of the backward shift operator. We prove a criterion of their invertibility. In this case, the Riesz-Schauder theory is applied, the use of which in such a situation goes back to the works by V.A. Tkachenko. In the topological dual space to the original space, the multiplication $\circledast$ is introduced and we show that its dual space endowed with a strong topology is a topological algebra. Using the mapping associated with Fourier-Laplace transform, the introduced multiplication $\circledast$ is implemented as a generalized Duhamel product in the corresponding space of ultradifferentiable or infinitely differentiable functions on $\Delta$. We prove a criterion for the invertibility of the Duhamel operator in this space. The multiplication $\circledast$ is used to extend the Duhamel's formula to classes of ultradifferentiable functions. It represents the solution of an inhomogeneous differential equation of finite order with constant coefficients, satisfying zero initial conditions at the point $0$, in the form of Duhamel's product of the right-hand side and a solution to this equation with the right-hand side identically equalling to $1$. The obtained results cover both the non-quasianalytic and quasianalytic cases.
Keywords: backward shift operator, entire function, Duhamel product, ultradifferentiable function.
Received: 07.04.2023
Document Type: Article
UDC: 517.982.274+517.983.22
MSC: 46E10, 47B38
Language: English
Original paper language: Russian
Citation: O. A. Ivanova, S. N. Melikhov, “On invertibility of Duhamel operator in spaces of ultradifferentiable functions”, Ufa Math. J., 15:4 (2023), 62–75
Citation in format AMSBIB
\Bibitem{IvaMel23}
\by O.~A.~Ivanova, S.~N.~Melikhov
\paper On invertibility of Duhamel operator in spaces of ultradifferentiable functions
\jour Ufa Math. J.
\yr 2023
\vol 15
\issue 4
\pages 62--75
\mathnet{http://mi.mathnet.ru//eng/ufa676}
\crossref{https://doi.org/10.13108/2023-15-4-62}
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  • https://doi.org/10.13108/2023-15-4-62
  • https://www.mathnet.ru/eng/ufa/v15/i4/p61
  • This publication is cited in the following 1 articles:
    Citing articles in Google Scholar: Russian citations, English citations
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