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

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 i...

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Autores principales: Bharathi,M. Jeyaram, Velmurugan,S., Esi,A., Subramanian,N.
Lenguaje:English
Publicado: Universidad Católica del Norte, Departamento de Matemáticas 2019
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Acceso en línea:http://www.scielo.cl/scielo.php?script=sci_arttext&pid=S0716-09172019000400783
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spelling oai:scielo:S0716-091720190004007832019-11-04On rough convergence of triple sequence spaces of Bernstein-Stancu operators of fuzzy numbers defined by a metric functionBharathi,M. JeyaramVelmurugan,S.Esi,A.Subramanian,N. 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.info:eu-repo/semantics/openAccessUniversidad Católica del Norte, Departamento de MatemáticasProyecciones (Antofagasta) v.38 n.4 20192019-12-01text/htmlhttp://www.scielo.cl/scielo.php?script=sci_arttext&pid=S0716-09172019000400783en10.22199/issn.0717-6279-2019-04-0051
institution Scielo Chile
collection Scielo Chile
language English
topic Triple sequences
Rough convergence
Closed and convex
Cluster points and rough limit points
Fuzzy numbers
Bernstein-Stancu polynomials
spellingShingle Triple sequences
Rough convergence
Closed and convex
Cluster points and rough limit points
Fuzzy numbers
Bernstein-Stancu polynomials
Bharathi,M. Jeyaram
Velmurugan,S.
Esi,A.
Subramanian,N.
On rough convergence of triple sequence spaces of Bernstein-Stancu operators of fuzzy numbers defined by a metric function
description 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.
author Bharathi,M. Jeyaram
Velmurugan,S.
Esi,A.
Subramanian,N.
author_facet Bharathi,M. Jeyaram
Velmurugan,S.
Esi,A.
Subramanian,N.
author_sort Bharathi,M. Jeyaram
title On rough convergence of triple sequence spaces of Bernstein-Stancu operators of fuzzy numbers defined by a metric function
title_short On rough convergence of triple sequence spaces of Bernstein-Stancu operators of fuzzy numbers defined by a metric function
title_full On rough convergence of triple sequence spaces of Bernstein-Stancu operators of fuzzy numbers defined by a metric function
title_fullStr On rough convergence of triple sequence spaces of Bernstein-Stancu operators of fuzzy numbers defined by a metric function
title_full_unstemmed On rough convergence of triple sequence spaces of Bernstein-Stancu operators of fuzzy numbers defined by a metric function
title_sort on rough convergence of triple sequence spaces of bernstein-stancu operators of fuzzy numbers defined by a metric function
publisher Universidad Católica del Norte, Departamento de Matemáticas
publishDate 2019
url http://www.scielo.cl/scielo.php?script=sci_arttext&pid=S0716-09172019000400783
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AT subramaniann onroughconvergenceoftriplesequencespacesofbernsteinstancuoperatorsoffuzzynumbersdefinedbyametricfunction
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