Distributive groupoids and the finite basis property

## Abstract A cutset of __H__ is a subset of ∪ __H__ which meets every element of __H.__ __H__ has the finite cutset property if every cutset of __H__ contains a finite one. We study this notion, and in particular how it is related to the compactness of __H__ for the natural topology. MSC: 04A20, 5

If the Liikasiewicz many-valued systems are treated as logics in the senst of the following section, to whirh a sequent belongs wlien every assignment of trut,h-ralues giving a deliignakcd value to every formnla on the left of the "I-" gives a designated value to the formula on the right, then these

Let G be a finite group, and let Cay(G, S) be a Cayley digraph of G. If, for all T ⊂ G, Cay(G, S) ∼ = Cay(G, T ) implies S α = T for some α ∈ Aut(G), then Cay(G, S) is called a CI-graph of G. For a group G, if all Cayley digraphs of valency m are CI-graphs, then G is said to have the m-DCI property;