The novel Tauberian conditions associated with the $(\overline{N},p,q)$ summability of double sequences

TL;DR

This paper explores new Tauberian conditions linking the $(\overline{N},p,q)$ summability method with $P$-convergence for double sequences, extending classical theorems through oscillation control and weight restrictions.

Contribution

It introduces novel Tauberian conditions that connect $(\overline{N},p,q)$ summability with $P$-convergence, generalizing classical results with oscillation and weight sequence considerations.

Findings

Established Tauberian conditions involving $O_L$-oscillation and $O$-oscillation.

Demonstrated that Landau-type and Hardy-type conditions serve as Tauberian criteria.

Unified classical Tauberian theorems under broader oscillation and weight restrictions.

Abstract

In this paper, our primary objective is to provide a fresh perspective on the relationship between the $(\overline{N},p,q)$ method, which is a product of relevant one-dimensional summability methods, and $P$-convergence for double sequences. To accomplish this objective, we establish certain Tauberian conditions that control the behavior of a double sequence in terms of both $O_L$-oscillation and $O$-oscillation in certain senses, building a bridge between $(\overline{N},p,q)$ summability and $P$-convergence, while imposing certain restrictions on the weight sequences. As special circumstances of our findings, we demonstrate that Landau-type $O_L$ condition with respect to $(P_m)$ and $(Q_n),$ as well as Hardy-type $O$ condition with respect to $(P_m)$ and $(Q_n),$ serve as Tauberian conditions for $(\overline{N},p,q)$ summability under particular additional conditions. Consequently, these results encompass all classical Tauberian theorems, including conditions such as slow decrease or slow oscillation in certain senses.