On the J\'onsson distributivity spectrum

Abstract

Suppose throughout that V is a congruence distributive variety. If m ≥ 1, let J V (m) be the smallest natural number k such that the congruence identity α ( β γ β … ) ⊂eq α β α γ α β … holds in V, with m occurrences of on the left and k occurrences of on the right. We show that if J V (m) =k, then J V (m ) ≤ k , for every natural number . The key to the proof is an identity which, through a variety, is equivalent to the above congruence identity, but involves also reflexive and admissible relations. If J V (1)=2 , that is, V is 3-distributive, then J V (m) ≤ m , for every m ≥ 3 (actually, a more general result is presented which holds even in nondistributive varieties). If V is m-modular, that is, congruence modularity of V is witnessed by m+1 Day terms, then J V (2) ≤ J V (1) + 2m2-2m -1 . Various problems are stated at various places.