Induced triangular norms and negations on bounded lattices Lobillo Borrero, Francisco Javier Navarro Garulo, Gabriel Merino González, Luis Miguel Santos Aláez, Evangelina Lattices Fuzzy sets negation triangular norm-conorm Some relevant notions in fuzzy set theory are those of triangular norm and conorm, and negation, which provide a systematic way of defining set-theoretic operations or, from other point of view, logical connectives. For instance, the majority of fuzzy implications are directly derived from these operators, so they play a prominent role in fuzzy control theory or in approximate reasoning. This incites the search of suitable t-norms, t-conorms and negations for solving each specific problem. In this paper we propose a procedure, that we call induction, for designing them on spaces of lattice-valued maps. Concretely, for each family of operators (t-norms, t-conorms or negations) indexed in the domain set, we may induce an operator of the same kind, so that our method offers a great flexibility in the design task. It may be applied to well-known fuzzy objects as interval-valued or type-2 fuzzy sets. Nevertheless, the theory is formally developed for arbitrary bounded lattices. 2024-09-05T06:58:11Z 2024-09-05T06:58:11Z 2021-07 journal article IEEE Transactions on Fuzzy Systems, vol. 29, no. 7, pp. 1802-1814 https://hdl.handle.net/10481/93952 10.1109/TFUZZ.2020.2985337 eng http://creativecommons.org/licenses/by-nc-nd/4.0/ open access Attribution-NonCommercial-NoDerivatives 4.0 Internacional IEEE