AbstractTotally instable semilattices are discussed. A construction process is described which creates a large family of totally instable semilattices having the property that any connected surmorphic image of one of these semilattices must be chain
Ultrafilters and maximal linked systems (MLS) of a lattice of sets are considered. Two following va...
AbstractThe principle of inclusion-exclusion on semilattices is extended on partially ordered sets a...
International audienceA lifting of a semilattice S is an algebra A such that the semilattice of comp...
Although equationally compact semilattices have been completely characterized [4], the question of J...
This dissertation centers its attention firstly on topological semilattices with small semi lattices...
We investigate categorical and amalgamation properties of the functor Idc assigning to every partial...
A topologized semilattice X is called complete if each non-empty chain C⊂ X has inf C and sup C that...
summary:We construct a countable chain of Boolean semilattices, with all inclusion maps preserving t...
Several` “classical” results on algebraic complete lattices extend to algebraic posets and, more gen...
AbstractWe consider the following “ordering” of the class of topological spaces: X ◁ Y iff X is (hom...
Ultrafilters and maximal linked systems (MLS) of a lattice of sets are considered. Two following va...
AbstractIn this paper we consider the Stone-Čech compactifications of discrete semigroups which are ...
thèse de 108 pages écrite en 2008.The set of all congruences of a given algebra, ordered by inclusio...
This paper arose from the following analogous questions: (1) Does a distributive topological lattice...
Presented in this paper is a method of constructing a compact semigroup S from a compact semilattic...
Ultrafilters and maximal linked systems (MLS) of a lattice of sets are considered. Two following va...
AbstractThe principle of inclusion-exclusion on semilattices is extended on partially ordered sets a...
International audienceA lifting of a semilattice S is an algebra A such that the semilattice of comp...
Although equationally compact semilattices have been completely characterized [4], the question of J...
This dissertation centers its attention firstly on topological semilattices with small semi lattices...
We investigate categorical and amalgamation properties of the functor Idc assigning to every partial...
A topologized semilattice X is called complete if each non-empty chain C⊂ X has inf C and sup C that...
summary:We construct a countable chain of Boolean semilattices, with all inclusion maps preserving t...
Several` “classical” results on algebraic complete lattices extend to algebraic posets and, more gen...
AbstractWe consider the following “ordering” of the class of topological spaces: X ◁ Y iff X is (hom...
Ultrafilters and maximal linked systems (MLS) of a lattice of sets are considered. Two following va...
AbstractIn this paper we consider the Stone-Čech compactifications of discrete semigroups which are ...
thèse de 108 pages écrite en 2008.The set of all congruences of a given algebra, ordered by inclusio...
This paper arose from the following analogous questions: (1) Does a distributive topological lattice...
Presented in this paper is a method of constructing a compact semigroup S from a compact semilattic...
Ultrafilters and maximal linked systems (MLS) of a lattice of sets are considered. Two following va...
AbstractThe principle of inclusion-exclusion on semilattices is extended on partially ordered sets a...
International audienceA lifting of a semilattice S is an algebra A such that the semilattice of comp...