I. F. Krasichkov-Ternovskii, “Spectral synthesis in a complex domain for a differential operator with constant coefficients. I: A duality theorem”, Math. USSR-Sb., 74:2 (1993), 309

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Mathematics of the USSR-Sbornik, 1993, Volume 74, Issue 2, Pages 309–335
DOI: https://doi.org/10.1070/SM1993v074n02ABEH003349 (Mi sm1392)

This article is cited in 15 scientific papers (total in 16 papers)

Spectral synthesis in a complex domain for a differential operator with constant coefficients. I: A duality theorem

I. F. Krasichkov-Ternovskii

Institute of Mathematics with Computing Centre, Ufa Science Centre, Russian Academy of Sciences

English version PDF (1309 kB) Citations (16) Russian version article

References:

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DOI: https://doi.org/10.1070/SM1993v074n02ABEH003349

Abstract: The problem of spectral synthesis in a complex domain for a differential operator with symbol

$\pi(z)=z^q+a_1z^{q-1}+\dots+a_q$ ,

$a_i\in\mathbf C$ , is reduced to the problem of a local description of the closed submodules of a module (of entire functions of exponential type) over the ring

$\mathbf C[\pi]$ of polynomials of the form

$c_0+c_1\pi+\dots+c_n\pi^n$ ,

$c_i\in\mathbf C$ .

Received: 04.06.1991

Bibliographic databases:

UDC: 517.5

MSC: Primary 43A45; Secondary 34L99

Language: English

Original paper language: Russian

Citation: I. F. Krasichkov-Ternovskii, “Spectral synthesis in a complex domain for a differential operator with constant coefficients. I: A duality theorem”, Math. USSR-Sb., 74:2 (1993), 309–335

Citation in format AMSBIB

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\by I.~F.~Krasichkov-Ternovskii

\paper Spectral synthesis in a~complex domain for a~differential operator with constant coefficients. I:~A~duality theorem

\jour Math. USSR-Sb.

\yr 1993

\vol 74

\issue 2

\pages 309--335

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Linking options:

https://www.mathnet.ru/eng/sm1392

https://doi.org/10.1070/SM1993v074n02ABEH003349

https://www.mathnet.ru/eng/sm/v182/i11/p1559

Cycle of papers

Spectral synthesis in a complex domain for a differential operator with constant coefficients. I: A duality theorem
I. F. Krasichkov-Ternovskii
Mat. Sb., 1991, 182:11, 1559–1587
Spectral synthesis in a complex domain for a differential operator with constant coefficients. II. The module method
I. F. Krasichkov-Ternovskii
Mat. Sb., 1992, 183:1, 3–19
Spectral synthesis in a complex domain for a differential operator with constant coefficients. III: Ample submodules
I. F. Krasichkov-Ternovskii
Mat. Sb., 1992, 183:6, 55–86
Spectral synthesis in a complex domain for a differential operator with constant coefficients. IV: Synthesis
I. F. Krasichkov-Ternovskii
Mat. Sb., 1992, 183:8, 23–46

This publication is cited in the following 16 articles:

Yu. S. Saranchuk, A. B. Shishkin, “General elementary solution of a homogeneous $q$ -sided convolution type equation”, St. Petersburg Math. J., 34:4 (2023), 695–713
Shishkin A.B., “Symmetric Representations of Holomorphic Functions”, Probl. Anal., 7:SI (2018), 123–135
A. B. Shishkin, “Exponential synthesis in the kernel of a symmetric convolution”, J. Math. Sci. (N. Y.), 229:5 (2018), 572–599
A. B. Shishkin, “Proektivnoe i in'ektivnoe opisaniya v kompleksnoi oblasti. Dvoistvennost”, Izv. Sarat. un-ta. Nov. ser. Ser.: Matematika. Mekhanika. Informatika, 14:1 (2014), 47–65
T. A. Volkovaya, “Sintez v polinomialnom yadre dvukh analiticheskikh funktsionalov”, Izv. Sarat. un-ta. Nov. ser. Ser.: Matematika. Mekhanika. Informatika, 14:3 (2014), 251–262
T. A. Volkovaya, A. B. Shishkin, “Lokalnoe opisanie tselykh funktsii. Podmoduli ranga 1”, Vladikavk. matem. zhurn., 16:2 (2014), 14–28
“Igor Fedorovich Krasichkov-Ternovskii (13.02.1935–08.03.2012)”, Ufimsk. matem. zhurn., 4:3 (2012), 187–192
Shishkin A.B., “Obilnost glavnykh $S[\pi]$ -podmodulei”, Izv. vysshikh uchebnykh zavedenii. Severo-Kavkazskii region. Ser.: Estestvennye nauki, 2009, no. 3, 34–38
A. P. Khromov, “Finite-dimensional perturbations of Volterra operators”, Journal of Mathematical Sciences, 138:5 (2006), 5893–6066
A. B. Shishkin, “Spectral synthesis for systems of differential operators with constant coefficients”, Sb. Math., 194:12 (2003), 1865–1898
I. F. Krasichkov-Ternovskii, A. B. Shishkin, “Local description of closed submodules of a special module of entire functions of exponential type”, Sb. Math., 192:11 (2001), 1621–1638
I. F. Krasichkov-Ternovskii, “Spectral synthesis and local description for several variables”, Izv. Math., 63:4 (1999), 729–755
A. B. Shishkin, “Spectral synthesis for systems of differential operators with constant coefficients. Duality theorem”, Sb. Math., 189:9 (1998), 1423–1440
I. F. Krasichkov-Ternovskii, “The fundamental principle for invariant subspaces of analytic functions. II”, Sb. Math., 188:6 (1997), 853–892
I. F. Krasichkov-Ternovskii, “Spectral synthesis in a complex domain for a differential operator with constant coefficients. III: Ample submodules”, Russian Acad. Sci. Sb. Math., 76:1 (1993), 165–188
I. F. Krasichkov-Ternovskii, “Spectral synthesis in a complex domain for a differential operator with constant coefficients. IV: Synthesis”, Russian Acad. Sci. Sb. Math., 76:2 (1993), 407–426

Citing articles in Google Scholar: Russian citations, English citations
Related articles in Google Scholar: Russian articles, English articles

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Abstract page:	464
Russian version PDF:	143
English version PDF:	30
References:	79
First page:	2

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