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Some Spectral Problems for First-Order Normal Differential Operators in the Weighted Hilbert Spaces of Vector Functions

Author

Listed:
  • Zameddin I. Ismailov

    (Department of Mathematics, Karadeniz Technical University, 61080 Trabzon, Türkiye)

  • Pembe Ipek Al

    (Department of Mathematics, Karadeniz Technical University, 61080 Trabzon, Türkiye)

  • Mohammad Sababheh

    (Department of Mathematics, Abdullah Al Salem University, Kuwait City 72303, Kuwait
    Department of Basic Sciences, Princess Sumaya University for Technology, Amman 11941, Jordan)

Abstract

In this article, in order for the minimal operator generated by the first-order differential-operator expression in the weighted Hilbert space of vector functions in the finite interval to be formal normal, the relationship between the variable operator coefficient of this differential-operator expression and the weight function is established. Afterwards, the general form of all normal extensions of the minimal operator is found using the Glazman–Krein–Naimark Method. Then, the structure of spectrum of such extensions is investigated. Later on, the issue of belonging to Schatten–von Neumann classes is explored, as well as the asymptotic behavior of the singular numbers of the inverse of such normal extensions. Lastly, an approach is developed on all normal extensions expressed in the weighted Hilbert spaces.

Suggested Citation

  • Zameddin I. Ismailov & Pembe Ipek Al & Mohammad Sababheh, 2026. "Some Spectral Problems for First-Order Normal Differential Operators in the Weighted Hilbert Spaces of Vector Functions," Mathematics, MDPI, vol. 14(9), pages 1-17, April.
    • Handle: RePEc:gam:jmathe:v:14:y:2026:i:9:p:1417-:d:1927077
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