This article introduces the concept of (α, β)-intuitionistic fuzzy positive implicative ideals in BCK-algebras, a novel extension of fuzzy set theory applied to algebraic structures. BCK-algebras are a class of algebraic structures that have been widely studied in the context of fuzzy logic and fuzzy set theory, with applications in information sciences, decision-making processes, and artificial intelligence. We utilize the relationships that belong to (∈) and quasi-coincidence (q) between intuitionistic fuzzy points and intuitionistic fuzzy sets, where α and β can be any of {∈, q, ∈ ∨ q, ∈ ∧ q} except ∈ ∧ q. This approach allows for a more nuanced and flexible treatment of fuzzy ideals in BCK-algebras, encompassing various existing concepts as special cases. The proposed notion generalizes various existing concepts in fuzzy BCK-algebras, providing a unified framework for studying implicative ideals. Key properties of (α, β)-intuitionistic fuzzy positive implicative ideals are investigated, including characterization theorems and relationships with other types of fuzzy ideals in BCK-algebras. We establish several important results, including necessary and sufficient conditions for an intuitionistic fuzzy set to be an (α, β)-intuitionistic fuzzy positive implicative ideal, and examine the relationships between these ideals and other types of fuzzy ideals, such as fuzzy implicative ideals and fuzzy positive implicative ideals. Several examples are provided to illustrate the concepts and demonstrate their significance, highlighting the applicability and relevance of the proposed notion. This work aims to enrich the theory of fuzzy BCK-algebras and contribute to the broader field of fuzzy algebraic structures, with potential applications in information sciences and decision-making processes. The introduced concepts and results are expected to stimulate further research in this direction, providing new avenues for exploration and discovery in fuzzy mathematics and its applications.