On spectra of upper Sergeev frequencies of linear differential equations

Authors

Keywords:

linear differential equation, spectrum of the upper Sergeev frequencies of zeros, spectrum of the upper
Supporting Agencies
The work was performed with financial support from the Belarusian Republican Foundation for Fundamental Research (agreement No. Ф17-102).

Abstract

It is known that the spectra (ranges) of upper and lower Sergeev frequencies of zeros, signs, and roots of a linear differential equation of order greater than two with continuous coefficients belong to the class of Suslin sets on the nonnegative half-line of the extended real line. Moreover, for the spectra of upper frequencies of third-order equations this result was inverted under the assumption that the spectra contain zero. In the present paper we obtain an inversion of the above statement for equations of the fourth order and higher. Namely, for an arbitrary zero-containing Suslin subset S on the non-negative half-line of the extended real line and a positive integer number n greater than three a n order linear differential equation is constructed, which spectra of the upper Sergeev frequencies of zeros, signs, and roots coincide with the set S.

Author Biography

  • Aliaksei S. Vaidzelevich, Institute of Mathematics, National Academy of Sciences of Belarus, 11 Surhanava Street, Minsk 220072, Belarus

    PhD (physics and mathematics); senior researcher at the department of differential equations

References

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  2. Sergeev IN. The determination and properties of characteristic frequencies of linear equations. In: Trudy seminara im. I. G. Petrovskogo. Vypusk 25. Moscow: Izdatel’stvo Moskovskogo universiteta; 2006. p. 249 –294. Russian.
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  5. Barabanov EA, Voidelevich AS. Remark on the theory of Sergeev frequencies of zeros, signs, and roots for solutions of linear differential equations: II. Differentsial’nye uravneniya. 2016;52(12):1595–1609. Russian.
  6. Gelbaum B, Olmsted J. Counterexamples in analysis. San Francisco: Holden-day; 1964. 200 p. Russian edition: Gelbaum B, Olmsted J. Kontrprimery v analize. Golubov BI, translator. Moscow: Mir; 1967.

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Published

2019-04-08

Issue

No. 1 (2019): Journal of the Belarusian State University. Mathematics and Informatics

Section

Differential Equations and Optimal Control

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How to Cite

On spectra of upper Sergeev frequencies of linear differential equations. (2019). Journal of the Belarusian State University. Mathematics and Informatics, 1, 28-32. https://doi.org/10.33581/2520-6508-2019-1-28-32