The Thins Ordering on Relations

Abstract

Earlier papers VB2022,VB2023a,VB2023b introduced the notions of a core and an index of a relation (an index being a special case of a core). A limited form of the axiom of choice was postulated -- specifically that all partial equivalence relations (pers) have an index -- and the consequences of adding the axiom to axiom systems for point-free reasoning were explored. In this paper, we define a partial ordering on relations, which we call the thins ordering. We show that our axiom of choice is equivalent to the property that core relations are the minimal elements of the thins ordering. We also characterise the relations that are maximal with respect to the thins ordering. Apart from our axiom of choice, the axiom system we employ is paired to a bare minimum and admits many models other than concrete relations -- we do not assume, for example, the existence of complements; in the case of concrete relations, the theorem is that the maximal elements of the thins ordering are the empty relation and the equivalence relations. This and other properties of thins provide further evidence that our axiom of choice is a desirable means of strengthening point-free reasoning on relations.