Lattices with congruence densities larger than 3/32

Abstract

By a 1997 result of R. Freese, an n-element lattice has at most 2n-1 congruences. This motivates us to define the congruence density cd(L) of a finite n-element lattice as |Con(L)|/2n-1, where |Con(L)| is the number of elements of the congruence lattice Con(L) of L. We prove that whenever L is a finite lattice with cd(L)>3/32, then L has the same number of join-irreducible and meet-irreducible elements. This result is sharp, since there exists a six-element lattice R6 with cd(R6)=3/32 but fewer join-irreducible than meet-irreducible elements. By R. Freese, C. Muresan, J. Kulin, and the present author's results, lattices with congruence densities larger than 1/8 have already been described. Here we decrease the lower threshold from 1/8 to 3/32. That is, we describe all finite lattices L such that cd(L)>3/32. As a corollary, we give the kth largest number of congruences of n-element lattices for n>8 and k∈\n+1, n+2, n+3,n+4\.