This paper introduces a new class of functions, termed δ-continuous functions, and investigates their fundamental characterizations and properties. Particular attention is given to their connections with other well-known classes of functions in topology and functional analysis. δ-1-continuity, viewed as a natural extension of classical continuity, provides a broader framework that captures settings where standard continuity may be insufficient. This generalization proves especially relevant in the study of spaces with distinctive structural features or in abstract mathematical contexts. The findings not only enrich the theory of generalized continuity but also highlight the potential applications of δ-1-continuous functions in advancing mathematical analysis.
Mohsen et al. (Mon,) studied this question.
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