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On Bilinear Narrow Operators

Author

Listed:
  • Marat Pliev

    (Southern Mathematical Institute, Russian Academy of Sciences, 362027 Vladikavkaz, Russia)

  • Nonna Dzhusoeva

    (Department of Mathematics and Computer Sciences, North-Ossetian State University Named after K.L. Khetagurov, 362025 Vladikavkaz, Russia)

  • Ruslan Kulaev

    (Southern Mathematical Institute, Russian Academy of Sciences, 362027 Vladikavkaz, Russia
    Department of Mathematics and Computer Sciences, North-Ossetian State University Named after K.L. Khetagurov, 362025 Vladikavkaz, Russia)

Abstract

In this article, we introduce a new class of operators on the Cartesian product of vector lattices. We say that a bilinear operator T : E × F → W defined on the Cartesian product of vector lattices E and F and taking values in a vector lattice W is narrow if the partial operators T x and T y are narrow for all x ∈ E , y ∈ F . We prove that, for order-continuous Köthe–Banach spaces E and F and a Banach space X , the classes of narrow and weakly function narrow bilinear operators from E × F to X are coincident. Then, we prove that every order-to-norm continuous C -compact bilinear regular operator T is narrow. Finally, we show that a regular bilinear operator T from the Cartesian product E × F of vector lattices E and F with the principal projection property to an order continuous Banach lattice G is narrow if and only if | T | is.

Suggested Citation

  • Marat Pliev & Nonna Dzhusoeva & Ruslan Kulaev, 2021. "On Bilinear Narrow Operators," Mathematics, MDPI, vol. 9(22), pages 1-12, November.
    • Handle: RePEc:gam:jmathe:v:9:y:2021:i:22:p:2892-:d:678555
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