Difference between revisions of "Binary relation"
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A two-place [[Predicate|predicate]] on a given set. The term is sometimes used to denote a subset of the set $A\times A$ of ordered pairs $(a,b)$ of elements of a given set $A$. A binary relation is a special case of a [[Relation|relation]]. Let $R\subseteq A\times A$. If $(a,b)\in R$, then one says that the element $a$ is in binary relation $R$ to the element $b$. An alternative notation for $(a,b)\in R$ is $aRb$. | A two-place [[Predicate|predicate]] on a given set. The term is sometimes used to denote a subset of the set $A\times A$ of ordered pairs $(a,b)$ of elements of a given set $A$. A binary relation is a special case of a [[Relation|relation]]. Let $R\subseteq A\times A$. If $(a,b)\in R$, then one says that the element $a$ is in binary relation $R$ to the element $b$. An alternative notation for $(a,b)\in R$ is $aRb$. | ||
The empty subset $\emptyset$ in $A\times A$ and the set $A\times A$ itself are called, respectively, the nil relation and the universal relation in the set $A$. The diagonal of the set $A\times A$, i.e. the set $\Delta=\{(a,a)\colon a\in A\}$, is the equality relation or the identity binary relation in $A$. | The empty subset $\emptyset$ in $A\times A$ and the set $A\times A$ itself are called, respectively, the nil relation and the universal relation in the set $A$. The diagonal of the set $A\times A$, i.e. the set $\Delta=\{(a,a)\colon a\in A\}$, is the equality relation or the identity binary relation in $A$. | ||
− | Let $R,R_1,R_2$ be binary relations in a set $A$. In addition to the set-theoretic operations of [[Union of sets|union]] $R_1\cup R_2$, [[Intersection of sets|intersection]] $R_1\cap R_2$, and [[Relative complement|complementation]] $R'=(A\times A)\setminus R$, one has the inversion | + | Let $R,R_1,R_2$ be binary relations in a set $A$. In addition to the set-theoretic operations of [[Union of sets|union]] $R_1\cup R_2$, [[Intersection of sets|intersection]] $R_1\cap R_2$, and [[Relative complement|complementation]] $R'=(A\times A)\setminus R$, one has the inversion or transpose |
$$R^{-1}=\{(a,b)\colon(b,a)\in R\},$$ | $$R^{-1}=\{(a,b)\colon(b,a)\in R\},$$ |
Revision as of 18:34, 19 October 2014
A two-place predicate on a given set. The term is sometimes used to denote a subset of the set $A\times A$ of ordered pairs $(a,b)$ of elements of a given set $A$. A binary relation is a special case of a relation. Let $R\subseteq A\times A$. If $(a,b)\in R$, then one says that the element $a$ is in binary relation $R$ to the element $b$. An alternative notation for $(a,b)\in R$ is $aRb$.
The empty subset $\emptyset$ in $A\times A$ and the set $A\times A$ itself are called, respectively, the nil relation and the universal relation in the set $A$. The diagonal of the set $A\times A$, i.e. the set $\Delta=\{(a,a)\colon a\in A\}$, is the equality relation or the identity binary relation in $A$.
Let $R,R_1,R_2$ be binary relations in a set $A$. In addition to the set-theoretic operations of union $R_1\cup R_2$, intersection $R_1\cap R_2$, and complementation $R'=(A\times A)\setminus R$, one has the inversion or transpose
$$R^{-1}=\{(a,b)\colon(b,a)\in R\},$$
as well as the operation of multiplication (or composition):
$$R_1\circ R_2=\{(a,b)\colon(\exists c\in A)(aR_1c\text{ and }cR_2b)\}.$$
The binary relation $R^{-1}$ is said to be the inverse of $R$. Multiplication of binary relations is associative, but as a rule not commutative.
A binary relation $R$ in $A$ is said to be 1) reflexive if $\Delta\subseteq R$; 2) transitive if $R\circ R\subseteq R$; 3) symmetric if $R^{-1}\subseteq R$; and 4) anti-symmetric if $R\cap R^{-1}\subseteq\Delta$. If a binary relation has some of the properties 1), 2), 3) or 4), the inverse relation $R^{-1}$ has these properties as well. The binary relation $R\subseteq A\times A$ is said to be functional if $R^{-1}\circ R\subseteq\Delta$.
The most important types of binary relations are equivalences, order relations (total and partial), and functional relations.
Binary relation. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Binary_relation&oldid=33628