Union (set theory)

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Union (set theory)

In set theory

Set theory

Set theory is the branch of mathematics that studies Set , which are collections of objects. Although any type of object can be collected into a set, set theory is applied most often to objects that are relevant to mathematics....
, the term Union (denoted as ) refers to a set operation used in the convergence of set elements to form a resultant set containing the elements of both sets. As a simple example, a union of two disjoint sets, which do not have elements in common results in a set containing all elements from both sets.

e define two sets which contain unique elements; those of A not occurring in B and vice versa, then the union of these sets results in a set which contains all elements of A and B.

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In set theory

Set theory

Definition

If we define two sets which contain unique elements; those of A not occurring in B and vice versa, then the union of these sets results in a set which contains all elements of A and B. In terms of notation, we could define this set operation as the following:

Other more complex operations can be done including the union, if the set is for example defined by a property rather than a finite or assumed infinite enumeration of elements. As an example, a set could be defined by a property or algebraic equation, which is referred to as a solution set when resolved. An example of a property used in a union would be the following:

A =

B =

If we are then to refer to a single element by the variable "x", then we can say that x is a member of the union if it is either an element present in set A and/or set B.

For example, the union of the sets and is . The resultant set in the example is not . Multiple occurrences of identical elements have no effect on the cardinality

Cardinality

In mathematics, the cardinality of a set is a measure of the "number of Element of the set". For example, the set A = contains 3 elements, and therefore A has a cardinality of 3....
of a set or its contents. The number 9 is not contained in the union of the set of prime number

Prime number

In mathematics, a prime number is a natural number which has exactly two distinct natural number divisors: 1 and itself. An infinitude of prime numbers exists, as demonstrated by Euclid around 300 BC....
s and the set of even numbers , because 9 is neither prime nor even.

Algebraic properties

Binary union (the union of just two sets at a time) is an associative operation; that is,

A ? (B ? C) = (A ? B) ? C.

The operations can be performed in any order, and the parentheses may be omitted without ambiguity (i.e. either of the above can be expressed equivalently as A ? B ? C). Similarly, union is commutative, so the sets can be written in any order. The empty set

Empty set

In mathematics, and more specifically set theory, the empty set is the unique Set having no members. Some axiomatic set theories assure that the empty set exists by including an axiom of empty set; in other theories, its existence can be deduced....
is an identity element

Identity element

In mathematics, an identity element is a special type of element of a Set with respect to a binary operation on that set. It leaves other elements unchanged when combined with them....
for the operation of union. That is, ? A = A, for any set A. Thus one can think of the empty set as the union of zero

0 (number)

0 is both a number and the numerical digit used to represent that number in numeral system. It plays a central role in mathematics as the additive identity of the integers, real numbers, and many other algebraic structures....
sets. In terms of the definitions, these facts follow from analogous facts about logical disjunction

Logical disjunction

File:ORGate2.pngIn logic and mathematics, or, also known as logical disjunction or inclusive disjunction is a logical operator that results in true whenever one or more of its operands are true....
.

Together with intersection

Intersection (set theory)

In mathematics, the intersection of two Set A and B is the set that contains all elements of A that also belong to B , but no other elements....
and complement

Complement (set theory)

In discrete mathematics and predominantly in set theory, a complement is a concept used in comparisons of sets to refer to the unique values of one set in relation to another....
, union makes any power set

Power set

In mathematics, given a Set S, the power set of S, written , P, ℘ or Power set#Representing subsets as functions, is the set of all subsets of S....
into a Boolean algebra. For example, union and intersection distribute over each other, and all three operations are combined in De Morgan's laws

De Morgan's laws

In formal logic, De Morgan's laws are rules relating the logical operators 'and' and 'or' in terms of each other via logical negation.History...
. Replacing union with symmetric difference

Symmetric difference

In mathematics, the symmetric difference of two Set is the set of elements which are in one of the sets, but not in both. This operation is the set-theoretic kin of the exclusive disjunction in Boolean logic....
gives a Boolean ring

Boolean ring

In mathematics, a Boolean ring R is a ring for which x2 = x for all x in R; that is, R consists only of idempotent elements....
instead of a Boolean algebra.

Forms

Finite unions

More generally, one can take the union of several sets at once. The union of A, B, and C, for example, contains all elements of A, all elements of B, and all elements of C, and nothing else. Formally, x is an element of A ? B ? C if and only if x is in A or x is in B or x is in C.

Union is an associative operation, it doesn't matter in what order unions are taken. In mathematics a finite union means any union carried out on a finite number of sets: it doesn't imply that the union set is a finite set

Finite set

In mathematics, finite set is a Set that has a finite number of element . For example,is a finite set with five elements. The number of elements of a finite set is a natural number , and is called the cardinality of the set....
.

Infinite unions

The most general notion is the union of an arbitrary collection of sets. If M is a set whose elements are themselves sets, then x is an element of the union of M if and only if

If and only if

If and only if, in logic and fields that rely on it such as mathematics and philosophy, is a biconditional logical connective between statements....
for at least one

Existential quantification

In predicate logic, an existential quantification is the predication of a property or relation to at least one member of the domain. In laymen's terms, it simply refers to something....
element A of M, x is an element of A. In symbols:

That this union of M is a set no matter how large a set M itself might be, is the content of the axiom of union

Axiom of union

In axiomatic set theory and the branches of logic, mathematics, and computer science that use it, the axiom of union is one of the axioms of Zermelo-Fraenkel set theory, stating that, for any set x there is a set y whose elements are precisely the elements of the elements of x....
in axiomatic set theory.

This idea subsumes the above paragraphs, in that for example, A ? B ? C is the union of the collection . Also, if M is the empty collection, then the union of M is the empty set. The analogy between finite unions and logical disjunction extends to one between infinite unions and existential quantification

Existential quantification

which refers to the union of the collection . Here I is a set, and A_i is a set for every i in I. In the case that the index set

Index set

In mathematics, the elements of a Set A may be indexed or labeled by means of a set J that is on that account called an index set....
I is the set of natural number

Natural number

In mathematics, a natural number can mean either an element of the Set = *n = = ? = ? ...
s, the notation is analogous to that of infinite series

Series (mathematics)

In mathematics, given an infinite set sequence of numbers , a series is informally the result of adding all those terms together: . These can be written more compactly using the summation symbol ?....
:

When formatting is difficult, this can also be written "A₁ ? A₂ ? A₃ ? ···". (This last example, a union of countably many sets, is very common in analysis; for an example see the article on s-algebras.) Finally, let us note that whenever the symbol "?" is placed before other symbols instead of between them, it is of a larger size.

Intersection distributes over infinitary union, in the sense that

We can also combine infinitary union with infinitary intersection to get the law

External links

De Morgan's laws formally proven from the axioms of set theory.

Union (set theory)

Definition

Algebraic properties

Forms

Finite unions

Infinite unions

See also

External links