Ternary equivalence relation

In mathematics, a ternary equivalence relation is a kind of ternary relation analogous to a binary equivalence relation. A ternary equivalence relation is symmetric, reflexive, and transitive. The classic example is the relation of collinearity among three points in Euclidean space. In an abstract set, a ternary equivalence relation determines a collection of equivalence classes or pencils that form a linear space in the sense of incidence geometry. In the same way, a binary equivalence relation on a set determines a partition.

Definition

A ternary equivalence relation on a set $X$ is a relation $E \subset X 3$ , written $[a, b, c]$ , that satisfies the following axioms:

Symmetry: If $[a, b, c]$ then $[b, c, a]$ and $[c, b, a]$ . (Therefore also $[a, c, b]$ , $[b, a, c]$ , and $[c, a, b]$ .)
Reflexivity: $[a, b, b]$ . Equivalently, if $a$ , $b$ , and $c$ are not all distinct, then $[a, b, c]$ .
Transitivity: If $a \neq b$ and $[a, b, c]$ and $[a, b, d]$ then $[b, c, d]$ . (Therefore also $[a, c, d]$ .)

References

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