On the paranormed Nörlund difference sequence space of fractional order and geometric properties

Taja Yaying

doi:10.1515/ms-2017-0459

Article

On the paranormed Nörlund difference sequence space of fractional order and geometric properties

Taja Yaying

Published/Copyright: January 29, 2021

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From the journal Mathematica Slovaca Volume 71 Issue 1

Abstract

In this article we introduce paranormed Nörlund difference sequence space of fractional order α, N^t(p, Δ^(α)) defined by the composition of fractional difference operator Δ^(α), defined by (Δ(α)x)k=∑i=0∞(−1)iΓ(α+1)i!Γ(α−i+1)xk−i, and Nörlund matrix N^t. We give some topological properties, obtain the Schauder basis and determine the α−, β− and γ-duals of the new space. We characterize certain matrix classes related to this new space. Finally we investigate certain geometric properties of the space N^t(p, Δ^(α)).

Keywords: Nörlund matrix; difference operator Δ(α); Schauder basis; α−; β−; γ-duals; matrix transformation; geometric properties

MSC 2010: Primary 46A45; 46B45; Secondary 46A80; 46B20

(Communicated by Gregor Dolinar)

Acknowledgement

The author would like to thank the anonymous referees for their careful reading and suggestions which have improved the readability of the paper.

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Received: 2019-10-08

Accepted: 2020-06-26

Published Online: 2021-01-29

Published in Print: 2021-02-23

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Articles in the same Issue

https://doi.org/10.1515/ms-2017-0459

Keywords for this article

Nörlund matrix; difference operator Δ(α); Schauder basis; α−; β−; γ-duals; matrix transformation; geometric properties