Abstract
This study introduces and rigorously examines the concept of fuzzy primely filters (FPYFs) in BL-algebras, marking a significant advancement in the field. The investigation extends beyond conceptualization to elucidate the complex interrelationships between FPYFs and established fuzzy filter classes within the BL-algebraic framework. Through comprehensive analysis, we uncover intricate connections and potential hierarchical structures among these diverse filter types. Our findings not only expand the theoretical landscape of BL-algebras but also provide a robust foundation for further exploration of fuzzy filter relationships. This research contributes to a deeper understanding of the algebraic structures underpinning fuzzy logic systems, offering new insights into the fundamental properties of BL-algebras and their associated filters.
Furthermore, by leveraging the concept of the complement set, we embark on a rigorous investigation into the interplay between FPYFs and fuzzy prime ideals (FPEIs). This investigation seeks to elucidate the nature of their interaction and potential implications for the broader theory of BL-algebras.
Thanks
The authors would like to thank the editor and the anonymous reviewers for their constructive comments and suggestions to improve the quality of the paper.
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Details
| Primary Language | English |
|---|---|
| Subjects | Mathematical Logic, Set Theory, Lattices and Universal Algebra |
| Journal Section | Research Articles |
| Authors | |
| Publication Date | October 1, 2025 |
| Submission Date | September 6, 2024 |
| Acceptance Date | December 14, 2024 |
| Published in Issue | Year 2025 Volume: 15 Issue: 10 |
