A Compendium of Continuous Lattices

Abstract: Abstract. Binary trees are very useful tools in computer science for estimating the running time of so-called comparison based algorithms, algorithms in which every action is ultimately based on a prior comparison between two elements. For two given algorithms A and B where the decision tree of A is more balanced than that of B, it is known that the average and worst case times of A will be better than those of B, i.e., T A(n) ≤ T B (n) and T W A (n) ≤ T W B (n). Thus the most balanced and the most imbalanced … Show more

“…If (M 1) and (AP P ) hold, then the five conditions are equivalent to each other. (3) by Proposition 4.3 (5) and (3) ⇐⇒ (4) see [11,12]. (1) =⇒ (2): We only need to prove that σ M (L) is a continuous lattice.…”

M-Scott Convergence and M-Scott Topology on Posets

“…If (M 1) and (AP P ) hold, then the five conditions are equivalent to each other. (3) by Proposition 4.3 (5) and (3) ⇐⇒ (4) see [11,12]. (1) =⇒ (2): We only need to prove that σ M (L) is a continuous lattice.…”

M-Scott Convergence and M-Scott Topology on Posets

“…An element a in L is called prime element if a ≥ b ∧ c implies a ≥ b or a ≥ c. a in L is called co-prime element if a is a prime element [3]. The set of non-unit prime elements in L is denoted by P (L).…”

P-Compactness in L -Topological Spaces

“…Given a complete lattice C, let us denote by Con(C) the complete lattice of complete congruences on C, and by JCon(C) and MCon(C) the complete lattices of, respectively, join-and meet-complete congruences on C. Recall that an equivalence relation [¤ C × C is a join-complete congruence if (Öi. The main result of this paper gives a sufficient condition on the complete lattice C in order that Con(C) is a complete sublattice of JCon(C): It turns out that this is true whenever C is continuous (in the standard sense of the book by Gierz et al [8]). From this result, by duality, we also get that if C is co-continuous then Con(C) is a complete sublattice of MCon(C).…”

Some properties of complete congruence lattices