Relation (mathematics): Difference between revisions
imported>Richard Pinch m (reordered paragraphs, link) |
mNo edit summary |
||
(One intermediate revision by one other user not shown) | |||
Line 10: | Line 10: | ||
:<math>R^\top = \{ (y,x) \in Y \times X : (x,y) \in R \} . \, </math> | :<math>R^\top = \{ (y,x) \in Y \times X : (x,y) \in R \} . \, </math> | ||
The ''composition'' of a relation ''R'' between ''X'' and ''Y'' and a relation ''S'' between ''Y'' and ''Z'' is | The ''[[relation composition|composition]]'' of a relation ''R'' between ''X'' and ''Y'' and a relation ''S'' between ''Y'' and ''Z'' is | ||
:<math> R \circ S = \{ (x,z) \in X \times Z : \exists y \in Y, ~ (x,y) \in R \hbox{ and } (y,z) \in S \} . \, </math> | :<math> R \circ S = \{ (x,z) \in X \times Z : \exists y \in Y, ~ (x,y) \in R \hbox{ and } (y,z) \in S \} . \, </math> | ||
Line 39: | Line 39: | ||
==Functions== | ==Functions== | ||
{{main|Function (mathematics)}} | {{main|Function (mathematics)}} | ||
We say that a relation ''R'' is ''functional'' if it satisfies the condition that every <math>x \in X</math> occurs in exactly one pair <math>(x,y) \in R</math>. We then define the value of the function at ''x'' to be that unique ''y''. We thus identify a [[function (mathematics)|function]] with its [[graph]]. Composition of relations corresponds to [[function composition]] in this definition. The identity relation is functional, and defines the [[identity function]] on ''X''. | We say that a relation ''R'' is ''functional'' if it satisfies the condition that every <math>x \in X</math> occurs in exactly one pair <math>(x,y) \in R</math>. We then define the value of the function at ''x'' to be that unique ''y''. We thus identify a [[function (mathematics)|function]] with its [[graph]]. Composition of relations corresponds to [[function composition]] in this definition. The identity relation is functional, and defines the [[identity function]] on ''X''.[[Category:Suggestion Bot Tag]] |
Latest revision as of 06:00, 11 October 2024
In mathematics a relation is a property which holds between certain elements of some set or sets. Examples include equality between numbers or other quantities; comparison or order relations such as "greater than" or "less than" between magnitudes; geometrical relations such as parallel, congruence, similarity or between-ness; abstract concepts such as isomorphism or homeomorphism. A relation may involve one term (unary) in which case we may identify it with a property or predicate; the commonest examples involve two terms (binary); three terms (ternary) and in general we write an n-ary relation.
Relations may be expressed by formulae, geometric concepts or algorithms, but in keeping with the modern definition of mathematics, it is most convenient to identify a relation with the set of values for which it holds true.
Formally, then, we define a binary relation between sets X and Y as a subset of the Cartesian product, . We write to indicate that , and say that x "stands in the relation R to" y, or that x "is related by R to" y.
The transpose of a relation R between X and Y is the relation between Y and X defined by
The composition of a relation R between X and Y and a relation S between Y and Z is
More generally, we define an n-ary relation to be a subset of the product of n sets .
Relations on a set
A relation R on a set X is a relation between X and itself, that is, a subset of .
- R is reflexive if for all .
- R is irrreflexive if for all .
- R is symmetric if ; that is, .
- R is antisymmetric if ; that is, R and its transpose are disjoint.
- R is transitive if ; that is, .
A relation on a set X is equivalent to a directed graph with vertex set X.
Equivalence relation
An equivalence relation on a set X is one which is reflexive, symmetric and transitive. The identity relation X is the diagonal .
Order
A (strict) partial order is which is irreflexive, antisymmetric and transitive. A weak partial order is the union of a strict partial order and the identity. The usual notations for a partial order are or for weak orders and or for strict orders.
A total or linear order is one which has the trichotomy property: for any x, y exactly one of the three statements , , holds.
Functions
We say that a relation R is functional if it satisfies the condition that every occurs in exactly one pair . We then define the value of the function at x to be that unique y. We thus identify a function with its graph. Composition of relations corresponds to function composition in this definition. The identity relation is functional, and defines the identity function on X.