Binary relation
A binary relation is a mathematical concept to do with "relations", such as "is greater than" and "is equal to" in arithmetic, or "is an element of" in set theory.
Formally, a binary relation over a set X and a set Y is a ordered triple R=(X, Y, G(R)) where G(R), called the graph of the relation R, is a subset of X × Y. If (x,y) ∈ G(R) then we say that x is R-related to y and write xRy or R(x,y).
Example: Suppose there are four objects: {ball, car, doll, gun} and four persons: {John, Mary, So, Venus}. Suppose that John owns the ball, Mary owns the doll, and Venus owns the car. No one owns the gun and So owns nothing. Then the binary relation "is owned by" is given as
- R=({ball, car, doll, gun}, {John, Mary, So, Venus}, {(ball,John), (doll,Mary), (car,Venus)}).
Note that two different relations could have the same graph. For example: the relation
- ({ball, car, doll, gun), {John, Mary, Venus}, {(ball,John), (doll,Mary), (car,Venus)}
Neverthesis, R is often identified as G(R) and "an ordered pair (x,y) ∈ G(R)" is usually denoted as "(x,y) ∈ R".
It may also be thought of as a binary function that takes as arguments an element x of X and an element y of Y and evaluates to true or false (indicating whether the ordered pair (x, y) is an element of the set which is the relation).
Special Relations
Some important properties that binary relation R over X and Y may or may not have are:- total
- for all x in X there exists a y in Y such that xRy
- functional
- for all x in X, and y and z in Y it holds that if xRy and xRz then y = z
- surjective
- for all y in Y there exists an x in X such that xRy
- injective
- for all x and z in X and y in Y it holds that if xRy and zRy then x = z
A binary relation that is functional is called a partial function; a binary relation that is both total and functional is called a function.
Relations over a set
If X = Y then we simply say that the binary relation is over X.Some important properties that binary relations over a set X may or may not have are:
- reflexive
- for all x in X it holds that xRx
- irreflexive
- for all x in X it holds that not xRx
- symmetric
- for all x and z in X it holds that if xRz then zRx
- antisymmetric
- for all x and z in X it holds that if xRz and zRx then x = z
- transitive
- for all x, y and z in X it holds that if xRy and yRz then xRz
- trichotomous
- for all x and y in X exactly one of xRy, yRx and x = y holds
A relation which is reflexive, symmetric and transitive is called an equivalence relation. A relation which is reflexive, antisymmetric and transitive is called a partial order.
See Also:
-- Function -- Partial order -- Total order -- Well-order -- Equivalence relation --cannot eat, though the servants bring me the best of food; and they pet
give it up and come home; don't break our hearts!" and all this terrifies
since yesterday I cannot stand on my feet anymore. And within this hour
and the night chill coming on, said things I could not understand, but
morning, and eagerly ask for the little doggie that did the brave deed,
humble little friend is gone where go the beasts that perish.'"
End of The Project Gutenberg Etext of A Dog's Tale, by Mark Twain
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