Abstract
It is proved recently that cuts of a lattice valued fuzzy set determine a residuated map from the codomain lattice to the power set of the domain ordered dually to inclusion. Conversely, every residuated map from a complete lattice to the power set of the domain determines a lattice valued fuzzy set whose cuts coincide with the values of that map. These connections are applied here to the lattice valued algebraic structures and in particular to \(\varOmega \)-algebras, with a special reference to separation property.
Partially supported by Ministry of Education, Science and Technological Development, Republic of Serbia through Mathematical Institute SASA and Faculty of Science, University of Novi Sad and by the European Cooperation in Science and Technology (COST) Action CA17124.
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Šešelja, B., Tepavčević, A. (2022). Lattice-Valued Algebraic Structures Via Residuated Maps. In: Harmati, I.Á., Kóczy, L.T., Medina, J., Ramírez-Poussa, E. (eds) Computational Intelligence and Mathematics for Tackling Complex Problems 3. Studies in Computational Intelligence, vol 959. Springer, Cham. https://doi.org/10.1007/978-3-030-74970-5_2
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