\mathcal{I}- almost Lacunary vector valued sequence spaces in 2- normed spaces

Year 2020, , 76 - 81, 12.11.2020

Rabia Savas

https://doi.org/10.47087/mjm.733096

Abstract

One of the wide-ranging applications and research areas of Summability theory is the concept of statistical convergence. This concept was studied a related concept of convergence by using lacunary sequence by Fridy and Orhan. At the last quarter of the 20th century, lacunary statistical convergence has been discussed and captured significant aspect of creating the basis of several investigations conducted in many branches of mathematics. On the other hand, in 1961 Krasnoselskii and Rutisky presented the definition of Orlicz function. Also, in 1963 G\"{a}hler introduced the notion of 2-normed spaces. The main goal of this article is to introduce $\mathcal{I}-$ almost convergence of lacunary sequences with regard to an Orlicz function
in 2-normed spaces and other sequence spaces by considering the concept of
ideal that was presented by Kostyrko and others. Additionally, we examine the relationship between these sequence spaces and fundamental inclusion theorems are investigated.

Keywords

sequence spaces, lacunary sequence, 2- normed spaces, I-convergence

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