On the Double Sequence Space $\mathcal{H}_{\vartheta}$ as an Extension of Hahn Space $h$

TL;DR

This paper explores the properties and duals of the Hahn double sequence space $\\mathcal{H}_{\vartheta}$, extending the classical Hahn space $h$, and characterizes matrix transformations involving this space.

Contribution

It introduces the space $\mathcal{H}_{\vartheta}$ as an extension of $h$, analyzes its topological properties, duals, and matrix classes, providing new insights into double sequence space theory.

Findings

Determined the duals of $\mathcal{H}_{\vartheta}$.

Characterized matrix classes involving $\mathcal{H}_{\vartheta}$.

Established conditions for transformations between $\mathcal{H}_{\vartheta}$ and other sequence spaces.

Abstract

Double sequence spaces have become a significant area of research within functional analysis due to their applications in various branches of mathematics and mathematical physics. In this study, we investigate Hahn double sequence space denoted as $\mathcal{H}_{\vartheta}$, where $\vartheta\in\{p,bp,r\}$, as an extension of the Hahn sequence space $h$. Our investigation begins with an analysis of several topological properties of $\mathcal{H}_{\vartheta}$, apart from a comprehensive analysis of the relationship between Hahn double sequences and some other classical double sequence spaces. The $\alpha-$dual, algebraic dual and $\beta(bp)-$dual, and $\gamma-$dual of the space $\mathcal{H}_{\vartheta}$ are detrmined. Furthermore, we define the determining set of $\mathcal{H}_{\vartheta}$ and we state the conditions concerning the characterization of four-dimensional (4D) matrix classes $(\mathcal{H}_{\vartheta},\lambda)$, where $\lambda=\{\mathcal{H}_{\vartheta},\mathcal{BV}, \mathcal{BV}_{\vartheta 0}, \mathcal{CS}_{\vartheta},\mathcal{CS}_{\vartheta 0},\mathcal{BS}\}$ and $(\mu,\mathcal{H}_{\vartheta})$, where $\mu=\{\mathcal{L}_u, \mathcal{C}_{\vartheta 0}, \mathcal{C}_{\vartheta},\mathcal{M}_{u}\}$. In conclusion, this research contributes non-standard investigation and various significant results into the space $\mathcal{H}_{\vartheta}$. The conducted results are deepen the understanding of the space $\mathcal{H}_{\vartheta}$ and open up new avenues for further research and applications in sequence space theory.