Statistical Convergence of n-Sequences and eta-Dual of Some Classical Sets of n-Sequences | Zendy

Hemen Dutta | Zendy; B. Surender Reddy | Zendy; Iqbal H. Jebril | Zendy; Vijay Kumar | Zendy

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Statistical Convergence of n-Sequences and eta-Dual of Some Classical Sets of n-Sequences

Author(s) -

Hemen Dutta,

B. Surender Reddy,

Iqbal H. Jebril,

Vijay Kumar

Publication year - 2014

Publication title -

malaysian journal of fundamental and applied sciences

Language(s) - English

Resource type - Journals

ISSN - 2289-599X

DOI - 10.11113/mjfas.v7n1.236

Subject(s) - dual polyhedron , mathematics , sequence (biology) , toeplitz matrix , dual (grammatical number) , generalization , combinatorics , convergence (economics) , discrete mathematics , pure mathematics , mathematical analysis , art , genetics , literature , economics , biology , economic growth

In this paper we introduce the notion of n-sequence and extend the notion of statistical convergence to n-sequences. Further we define the notion of eta-dual as a generalization of Köthe-Toeplitz dual for subsets of n-sequence spaces and compute eta-duals of some classical sets of n-sequences.

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