Relation identities in 3-distributive varieties

Abstract

Let α, β, γ, … , , … R, S, T, … be variables for, respectively, congruences, tolerances and reflexive admissible relations. Let juxtaposition denote intersection. We show that if the identity α(β ) ⊂eq α β α α β holds in a variety V, then V has a majority term, equivalently, V satisfies α (β γ) ⊂eq α β α γ . The result is unexpected, since in the displayed identity we have one more factor on the right and, moreover, if we let be a congruence, we get a condition equivalent to 3-distributivity, which is well-known to be strictly weaker than the existence of a majority term. The above result is optimal in many senses, for example, we show that slight variations on the displayed identity, such as R (S γ) ⊂eq R S R γ R S or R(S T) ⊂eq R S RT RT RS hold in every 3-distributive variety. Similar identities are valid even in varieties with 2 Gumm terms, with no distributivity assumption. We also discuss relation identities in n-permutable varieties and present a few remarks about implication algebras.