Add to ORKGAbstract: We give a necessary and su ¢ cient condition for a bounded involution lattice to be isomorphic to the direct square of its invariant part. This result is applied to show relations between related lattices of an algebra: For instance, generalizing some earlier results of G. Czédli and L. Szabó it is proved that any algebra admits a connected compatible partial order whenever its quasiorder lattice is isomorphic to the direct square of its congruence lattice. Further, a majority algebra is lattice ordered if and only if the lattice of its compatible reexive relations is isomorphic to the direct square of its tolerance lattice. In the latter case, one can establish a bijective correspondence between factor congruence pairs of the alg...
Abstract. The study of sup lattices teaches us the important distinction between the algebraic part ...
Abstract. We give a new characterization of lattices with relative Stone congruence lattices and we ...
This study investigates the relation between partition of a lattice into convex sublattices and the ...
AbstractLet L be a bounded lattice, let [a,b] and [c,d] be intervals of L, and let ϕ:[a,b]→[c,d] be ...
AbstractThe lattice of subalgebras of an alternative algebra can determine the algebraic structure o...
We prove that an infinite (bounded) involution lattice and even pseudo-Kleene algebra can have any n...
summary:We generalize the correspondence between basic algebras and lattices with section antitone i...
In the theory of lattice-ordered groups, there are interesting examples of properties — such as proj...
summary:Using congruence schemes we formulate new characterizations of congruence distributive, arit...
The first of two results is a 1-1-correspondence between isomorphism classes of finite-dimensional v...
A weak congruence is a symmetric, transitive, and compatible relation. An element u of an algebraic ...
We answer the question, when a partial order in a partially ordered algebraic structure has a compat...
Let A be a finite set of finite algebras and assume that K = Var(A), the variety generated by A, is ...
Lattice-Ordered Stone Spaces are shown to be the dual spaces of partial orders or meet semilattices....
AbstractIn 1983, Wille raised the question: Is every complete lattice L isomorphic to the lattice of...
Abstract. The study of sup lattices teaches us the important distinction between the algebraic part ...
Abstract. We give a new characterization of lattices with relative Stone congruence lattices and we ...
This study investigates the relation between partition of a lattice into convex sublattices and the ...
AbstractLet L be a bounded lattice, let [a,b] and [c,d] be intervals of L, and let ϕ:[a,b]→[c,d] be ...
AbstractThe lattice of subalgebras of an alternative algebra can determine the algebraic structure o...
We prove that an infinite (bounded) involution lattice and even pseudo-Kleene algebra can have any n...
summary:We generalize the correspondence between basic algebras and lattices with section antitone i...
In the theory of lattice-ordered groups, there are interesting examples of properties — such as proj...
summary:Using congruence schemes we formulate new characterizations of congruence distributive, arit...
The first of two results is a 1-1-correspondence between isomorphism classes of finite-dimensional v...
A weak congruence is a symmetric, transitive, and compatible relation. An element u of an algebraic ...
We answer the question, when a partial order in a partially ordered algebraic structure has a compat...
Let A be a finite set of finite algebras and assume that K = Var(A), the variety generated by A, is ...
Lattice-Ordered Stone Spaces are shown to be the dual spaces of partial orders or meet semilattices....
AbstractIn 1983, Wille raised the question: Is every complete lattice L isomorphic to the lattice of...
Abstract. The study of sup lattices teaches us the important distinction between the algebraic part ...
Abstract. We give a new characterization of lattices with relative Stone congruence lattices and we ...
This study investigates the relation between partition of a lattice into convex sublattices and the ...