The lattice of congruences of a finite line frame

Abstract

Let F=F,R be a finite Kripke frame. A congruence of F is a bisimulation of F that is also an equivalence relation on F. The set of all congruences of F is a lattice under the inclusion ordering. In this article, we investigate this lattice in the case that F is a finite line frame. We give concrete descriptions of the join and meet of two congruences with a non-trivial upper bound. Through these descriptions we show that for every non-trivial congruence ρ, the interval [IdF,ρ] embeds into the lattice of divisors of a suitable positive integer. We also prove that any two congruences with a non-trivial upper bound permute.