Congruences and trajectories in planar semimodular lattices

Abstract

A 1955 result of J.~Jakub\'i k states that for the prime intervals and of a finite lattice, ≥ iff is congruence-projective to~ (via intervals of arbitrary size). The problem is how to determine whether ≥ involving only prime intervals. Two recent papers approached this problem in different ways. G. Cz\'edli's used trajectories for slim rectangular lattices---a special subclass of slim, planar, semimodular lattices. I used the concept of prime-projectivity for arbitrary finite lattices. In this note I show how my approach can be used to generalize Cz\'edli's result to arbitrary slim, planar, semimodular lattices.