Statistical $p$-convergence in lattice-normed Riesz spaces

Abdullah Ayd{\i}n; Reha Yapal{\i}; Erdal Korkmaz

arXiv:2204.10499·math.FA·April 25, 2022

Statistical $p$-convergence in lattice-normed Riesz spaces

Abdullah Ayd{\i}n, Reha Yapal{\i}, Erdal Korkmaz

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TL;DR

This paper introduces and studies the properties of statistical $p$-convergence in lattice-normed Riesz spaces, generalizing recent concepts of statistical order convergence and related types.

Contribution

It extends the concept of statistical $p$-convergence to general lattice-normed Riesz spaces and investigates its fundamental properties.

Findings

01

Established basic properties of statistical $p$-convergence.

02

Connected statistical $p$-convergence with existing convergence notions.

03

Provided a framework for further research in lattice-normed Riesz spaces.

Abstract

A sequence $(x_{n})$ in a lattice-normed space $(X, p, E)$ is statistical $p$ -convergent to $x \in X$ if there exists a statistical $p$ -decreasing sequence $q \stpd 0$ with an index set $K$ such that $δ (K) = 1$ and $p (x_{n_{k}} - x) \leq q_{n_{k}}$ for every $n_{k} \in K$ . This convergence has been investigated recently for $(X, p, E) = (E, ∣ \cdot ∣, E)$ under the name of statistical order convergence and under the name of statistical multiplicative order convergence, and also, for taking $E$ as a locally solid Riesz space under the names statistically unbounded $τ$ -convergence and statistically multiplicative convergence. In this paper, we study the general properties of statistical $p$ -convergence.

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Taxonomy

TopicsApproximation Theory and Sequence Spaces · Advanced Banach Space Theory · Advanced Harmonic Analysis Research