Unions of admissible relations

Abstract

We show that a variety V is congruence distributive if and only if there is some h such that the inclusion (1) ( σ σ ) ⊂eq ( σ ) ( σ ) … (h factors) holds in every algebra in V, for every tolerance and every U-admissible relation σ. By a U-admissible relation we mean a binary relation which is the set-theoretical union of a set of reflexive and admissible relations. For any fixed h, a Maltsev-type characterization is given for the inclusion (1). It is an open problem whether (1) is still equivalent to congruence distributivity when is assumed to be a U-admissible relation, rather than a tolerance. In both cases many equivalent formulations for (1) are presented. The results suggest that it might be interesting to study the structure of the set of U-admissible relations on an algebra, as well as identities dealing with such relations.