Union of sets
sum of sets
One of the basic operations on (collections of) sets. Suppose one has some (finite or infinite) collection 
of sets. Then the collection of all elements that belong to at least one of the sets in 
is called the union, or, more rarely, the sum, of (the sets in) 
; it is denoted by 
.
Comments
In case 
, the union is also denoted by 
, 
, 
, or, more rarely, by 
.
In the Zermelo–Fraenkel axiom system for set theory, the sum-set axiom expresses that the union of a set of sets is a set.
If the sets 
are disjoint, then in the category 
the union of the objects 
is the sum of these objects in the categorical sense. In general, the sum of objects 
is the disjoint union 
. The natural imbeddings 
are given by 
. Thus, 
together with the 
, 
, satisfies the universal property for categorical sums: For every family of mappings 
there is a unique mapping 
such that 
.
References
| [a1] | K. Kuratowski, "Introduction to set theory and topology" , Pergamon (1961) pp. 25 (Translated from French) |
Union of sets. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Union_of_sets&oldid=20845