On rough convergence of triple sequence spaces of Bernstein-Stancu operators of fuzzy numbers defined by a metric function.

Authors

Keywords:

Triple sequences, rough convergence, closed and convex, cluster points and rough limit points, fuzzy numbers, Bernstein-Stancu polynomials

Abstract

We define the concept of rough limit set of a triple sequence space of Bernstein-Stancu polynomials of fuzzy numbers and obtain the relation between the set of rough limit and the extreme limit points of a triple sequence space of Bernstein-Stancu polynomials of fuzzy numbers. Finally, we investigate some properties of the rough limit set of Bernstein-Stancu polynomials.

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Author Biographies

  • M. Jeyaram Bharathi, Hindustan Institute of Technology and Science.

    Department of Mathematics.

  • S. Velmurugan, Hindustan Institute of Technology and Science.

    Department of Mathematics.

  • A. Esi, Adiyaman University.

    Department of Mathematics.

  • N. Subramanian, SASTRA University.

    Department of Mathematics.

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Published

2018-11-22

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Artículos

How to Cite

[1]
“On rough convergence of triple sequence spaces of Bernstein-Stancu operators of fuzzy numbers defined by a metric function”., Proyecciones (Antofagasta, On line), vol. 37, no. 4, pp. 713–730, Nov. 2018, Accessed: Sep. 18, 2024. [Online]. Available: https://www.revistaproyecciones.cl/index.php/proyecciones/article/view/3276