Residuated lattices form the basis of certain kinds of logical interpretations. Also, complete commutative integral zero-bounded residuated lattices are used as a set of truth values for fuzzy logic values, Which are more general than the traditional bounded interval introduced by Zadeh. At times, it is important to know whether or not the lattice can be residuated in the first place. This thesis reviews the literature in lattice residuability and adds more observations. Specifically, (1) bounded chains and top-residuated lattices are show [sic] to be residuable, and (2) additional conditions necessary for residuability are established --Abstract, page iii
Abstract. We prove that some properties of the definition of complete resid-uated lattice [2,4] can ...
In this paper, we present triangle algebras: residuated lattices equipped with two modal, or approxi...
In this paper, a theorem on the existence of complete embedding of partially ordered monoids into co...
summary:We investigate some (universal algebraic) properties of residuated lattices—algebras which p...
An important concept in the theory of residuated lattices and other algebraical structures used for ...
A bounded integral residuated lattice ( = residuated lattice, for short) is an algebra M = (M; ,∨,∧,...
Given a subset B of a complete residuated lattice, what are its points which are reasonably close to...
Abstract. Residuation is a fundamental concept of ordered structures and categories. In this survey ...
Residuation is a fundamental concept of ordered structures and categories. In this survey we conside...
(Bounded integral) residuated lattices (which need not be commutative) form a large class of algebra...
Fuzzy formal logics were introduced in order to handle graded truth values instead of only 'true' an...
In this (part survey) paper,we revisit algebraic and proof-theoretic methods developed by Franco Mon...
Multilattices are generalisations of lattices introduced by Mihail Benado. Hereplaced the existence ...
Abstract. We consider the fuzzy logic ALCI with semantics based on a finite residuated lattice. We s...
summary:Commutative bounded integral residuated lattices form a large class of algebras containing s...
Abstract. We prove that some properties of the definition of complete resid-uated lattice [2,4] can ...
In this paper, we present triangle algebras: residuated lattices equipped with two modal, or approxi...
In this paper, a theorem on the existence of complete embedding of partially ordered monoids into co...
summary:We investigate some (universal algebraic) properties of residuated lattices—algebras which p...
An important concept in the theory of residuated lattices and other algebraical structures used for ...
A bounded integral residuated lattice ( = residuated lattice, for short) is an algebra M = (M; ,∨,∧,...
Given a subset B of a complete residuated lattice, what are its points which are reasonably close to...
Abstract. Residuation is a fundamental concept of ordered structures and categories. In this survey ...
Residuation is a fundamental concept of ordered structures and categories. In this survey we conside...
(Bounded integral) residuated lattices (which need not be commutative) form a large class of algebra...
Fuzzy formal logics were introduced in order to handle graded truth values instead of only 'true' an...
In this (part survey) paper,we revisit algebraic and proof-theoretic methods developed by Franco Mon...
Multilattices are generalisations of lattices introduced by Mihail Benado. Hereplaced the existence ...
Abstract. We consider the fuzzy logic ALCI with semantics based on a finite residuated lattice. We s...
summary:Commutative bounded integral residuated lattices form a large class of algebras containing s...
Abstract. We prove that some properties of the definition of complete resid-uated lattice [2,4] can ...
In this paper, we present triangle algebras: residuated lattices equipped with two modal, or approxi...
In this paper, a theorem on the existence of complete embedding of partially ordered monoids into co...