As well-known, in a finitary algebraic structure the set $\Gamma$ of all the non-generators is the intersection of all the maximal proper substructures. In particular, $\Gamma$ is a substructure. We show that the corresponding statements hold for complete semilattices but fail for complete lattices, when as the notion of substructure we take complete subsemilattices and complete sublattices, respectively.Comment: v.2, some minor improvements, a few historical comment
AbstractWe present two examples of distributive algebraic lattices which are not isomorphic to the c...
Canonical extensions of (bounded) lattices have been extensively studied, and the basic existence an...
International audienceWe denote by Conc(A) the semilattice of compact congruences of an algebra A. G...
As is well-known, in a finitary algebraic structure the set Γ of all the non-generators is the inters...
Abstract. We prove that some properties of the definition of complete resid-uated lattice [2,4] can ...
AbstractThe purpose of this note is to prove the duality of several pairs of categories of complete ...
For an algebraic structure A, let SubA denote the substructure lattice of A. For a class K of algebr...
Substructural logics extending the full Lambek calculus FL have largely benefited from a systematica...
We compare two definitions of non-generator for full AFL's, leading to two sets of non-generators fo...
The main result of this paper is that the class of con-gruence lattices of semilattices satisfies no...
Abstract. Directoids as a generalization of semilattices were introduced by J. Ježek and R. Quacken...
We characterize well-founded algebraic lattices by means of forbidden subsemilattices of the join-se...
AbstractThe dimension of a partially ordered set P is the smallest integer n (if it exists) such tha...
summary:Completely regular semigroups $\mathcal {CR}$ are considered here with the unary operation o...
Substructural logics extending the full Lambek calculus FL have largely benefited from a systematica...
AbstractWe present two examples of distributive algebraic lattices which are not isomorphic to the c...
Canonical extensions of (bounded) lattices have been extensively studied, and the basic existence an...
International audienceWe denote by Conc(A) the semilattice of compact congruences of an algebra A. G...
As is well-known, in a finitary algebraic structure the set Γ of all the non-generators is the inters...
Abstract. We prove that some properties of the definition of complete resid-uated lattice [2,4] can ...
AbstractThe purpose of this note is to prove the duality of several pairs of categories of complete ...
For an algebraic structure A, let SubA denote the substructure lattice of A. For a class K of algebr...
Substructural logics extending the full Lambek calculus FL have largely benefited from a systematica...
We compare two definitions of non-generator for full AFL's, leading to two sets of non-generators fo...
The main result of this paper is that the class of con-gruence lattices of semilattices satisfies no...
Abstract. Directoids as a generalization of semilattices were introduced by J. Ježek and R. Quacken...
We characterize well-founded algebraic lattices by means of forbidden subsemilattices of the join-se...
AbstractThe dimension of a partially ordered set P is the smallest integer n (if it exists) such tha...
summary:Completely regular semigroups $\mathcal {CR}$ are considered here with the unary operation o...
Substructural logics extending the full Lambek calculus FL have largely benefited from a systematica...
AbstractWe present two examples of distributive algebraic lattices which are not isomorphic to the c...
Canonical extensions of (bounded) lattices have been extensively studied, and the basic existence an...
International audienceWe denote by Conc(A) the semilattice of compact congruences of an algebra A. G...