Transitive relation: Difference between revisions
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In [[set theory]], a '''transitive relation''' on a [[set (mathematics)|set]] is a [[relation (mathematics)|relation]] with the property that if ''x''→''y'' and ''y''→''z'' then ''x''→''z''. | In [[set theory]], a '''transitive relation''' on a [[set (mathematics)|set]] is a [[relation (mathematics)|relation]] with the property that if ''x''→''y'' and ''y''→''z'' then ''x''→''z''. | ||
Revision as of 13:28, 6 February 2009
In set theory, a transitive relation on a set is a relation with the property that if x→y and y→z then x→z.
Examples
- An equivalence relation is transitive:
- Equality is transitive: if x=y and y=z then x=z;
- The trivial (always-true) relation is transitive;
- An order relation is transitive:
- The usual order on the integers is transitive: if x>y and y>z then x>z;
- Divisibility on the natural numbers is transitive: if x divides y and y divides z then x divides z;
- Inclusion on subsets of a set is transitive: if x is a subset of y and y is a subset of z then x is a subset of z.
Properties
- The intersection of transitive relations is transitive. That is, if R and S are transitive relations on a set X, then the relation R&S, defined by x R&S y if x R y and x S y, is also transitive. The same holds for intersections of arbitrary families of transitive relations: indeed, the transitive relations on a set form a closure system.
Transitivity may be defined in terms of relation composition. A relation R is transitive if the composite R.R implies (is contained in) R.
Transitive closure
The transitive closure of a relation R may be defined as the intersection R* of all transitive relations containing R (one always exists, namely the always-true relation): loosely the "smallest" transitive relation containing R. The closure may also be constructed as
where denotes the composition of R with itself n times.