Homomorphisms between complete chains and the independence of the axioms of limitoid (Q912877)

A few years ago, G. Greco introduced the notion of limitoid, which is a generalization of the notions of lim inf and lim sup. If X is a set and L is a complete lattice, then an L-limitoid in X is defined to be a map T from \(L^ X\) into L satisfying a set of three conditions. In this paper the author gives a necessary and sufficient condition for the existence of a map from \(L^ X\) into L satisfying the first two of these conditions but not the third one, in case X has at least two elements and L is completely distributive.