What question did this study set out to answer?

The aim is to explore quasi-Cauchy sequences within the framework of theta-parametric metric spaces and their relationships to continuity concepts.

April 1, 2026Open Access

Quasi-Cauchy Sequences on -Parametric Metric Spaces

Key Points

The aim is to explore quasi-Cauchy sequences within the framework of theta-parametric metric spaces and their relationships to continuity concepts.
Introduced quasi-Cauchy sequences in theta-parametric metric spaces.
Established relationships among convergent, Cauchy, and quasi-Cauchy sequences.
Defined ward compactness and ward continuity in this metric context.
Examined continuity properties of functions based on ward continuity.
Demonstrated that ward continuity implies ordinary continuity in certain conditions.
Showed that uniformly continuous functions are ward continuous.
Confirmed that uniform limits of ward-continuous functions preserve ward continuity.
Established that all ward-continuous functions on E form a closed set of continuous functions.

Abstract

This paper proposes quasi-Cauchy sequences in -parametric metric spaces, a generalized metric framework introduced by Moussaoui et al. in 2024. It establishes fundamental relationships among convergent, Cauchy, and quasi-Cauchy sequences, and puts forward concepts of ward compactness and ward continuity in -parametric metric spaces. Moreover, the present paper demonstrates that ward continuity on a ward-compact subset in which every quasi-Cauchy sequence admits a convergent subsequence implies ordinary continuity, that uniformly continuous functions are necessarily ward continuous, and that uniform limits of ward-continuous functions preserve ward continuity. Consequently, all ward-continuous functions on E form a closed set of continuous functions on E.

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Quasi-Cauchy Sequences on -Parametric Metric Spaces

Key Points

Abstract

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