Complement (set theory)

In set theory, the complement of a set A refers to elements not in A. The relative complement of A with respect to a set B, also termed the difference of sets A and B, written B \ A, is the set of elements in B but not in A. When all sets under consideration are considered to be subsets of a given set U, the absolute complement of A is the set of elements in U but not in A.

Relative complement


Definition

If A and B are sets, then the relative complement of A in B,[1] also termed the set-theoretic difference of B and A,[2] is the set of elements in B but not in A.

The relative complement of A (left circle) in B (right circle):

The relative complement of A in B is denoted B \ A according to the ISO 31-11 standard. It is sometimes written BA, but this notation is ambiguous, as in some contexts it can be interpreted as the set of all elements ba, where b is taken from B and a from A.

Formally:

Examples

Properties

Let A, B, and C be three sets. The following identities capture notable properties of relative complements:

  • .
  • .
  • ,
    with the important special case demonstrating that intersection can be expressed using only the relative complement operation.
  • .
  • .
  • .
  • .
  • .

Absolute complement

The absolute complement of A in U:

Definition

If A is a set, then the absolute complement of A (or simply the complement of A) is the set of elements not in A. In other words, if U is the universe that contains all the sets under study, and there is no need to mention it because it is obvious and unique, then the absolute complement of A is the relative complement of A in U:[3]

.

Formally:

The absolute complement of A is usually denoted by . Other notations include , , , , and .[4]

Examples

Properties

Let A and B be two sets in a universe U. The following identities capture important properties of absolute complements:

De Morgan's laws:[1]
Complement laws:[1]
  • (this follows from the equivalence of a conditional with its contrapositive).
Involution or double complement law:
Relationships between relative and absolute complements:
Relationship with set difference:

The first two complement laws above show that if A is a non-empty, proper subset of U, then {A, Ac} is a partition of U.

LaTeX notation

In the LaTeX typesetting language, the command \setminus[5] is usually used for rendering a set difference symbol, which is similar to a backslash symbol. When rendered, the \setminus command looks identical to \backslash except that it has a little more space in front and behind the slash, akin to the LaTeX sequence \mathbin{\backslash}. A variant \smallsetminus is available in the amssymb package.

Complements in various programming languages

Some programming languages allow for manipulation of sets as data structures, using these operators or functions to construct the difference of sets a and b:

.NET Framework
b.Except(a);
C++
set_difference(a.begin(), a.end(), b.begin(), b.end(), result.begin());
Clojure
(clojure.set/difference a b)[6]
Common Lisp
set-difference, nset-difference[7]
F#
Set.difference a b[8]

or

a - b[9]
Falcon
diff = a - b[10]
Haskell
difference a b
a \\ b[11]
Java
diff = a.clone();
diff.removeAll(b);[12]
Julia
setdiff[13]
Mathematica
Complement[14]
MATLAB
setdiff[15]
OCaml
Set.S.diff[16]
Octave
setdiff[17]
PARI/GP
setminus[18]
Pascal
SetDifference := a - b;
Perl 5
# for perl version >= 5.10
@a = grep {not $_ ~~ @b} @a;
Perl 6
$A$B
$A (-) $B # texas version
PHP
array_diff($a, $b);[19]
Prolog
a(X),\+ b(X).
Python
diff = a.difference(b)[20]
diff = a - b[20]
R
setdiff[21]
Racket
(set-subtract a b)[22]
Ruby
diff = a - b[23]
Scala
a.diff(b)[24]

or

a -- b[24]
Smalltalk (Pharo)
a difference: b
SQL
SELECT * FROM A
EXCEPT
SELECT * FROM B
Unix shell
comm -23 a b[25]
grep -vf b a # less efficient, but works with small unsorted sets

See also

Notes

  1. 1 2 3 Halmos 1960, p. 17.
  2. Devlin 1979, p. 6.
  3. The set other than A is thus implicitly mentioned in an absolute complement, and explicitly mentioned in a relative complement.
  4. Bourbaki 1970, p. E II.6.
  5. The Comprehensive LaTeX Symbol List
  6. clojure.set API reference
  7. Common Lisp HyperSpec, Function set-difference, nset-difference. Accessed on September 8, 2009.
  8. Set.difference<'T> Function (F#). Accessed on July 12, 2015.
  9. Set.( - )<'T> Method (F#). Accessed on July 12, 2015.
  10. Array subtraction, data structures. Accessed on July 28, 2014.
  11. Data.Set (Haskell)
  12. Set (Java 2 Platform SE 5.0). JavaTM 2 Platform Standard Edition 5.0 API Specification, updated in 2004. Accessed on February 13, 2008.
  13. . The Standard Library--Julia Language documentation. Accessed on September 24, 2014
  14. Complement. Mathematica Documentation Center for version 6.0, updated in 2008. Accessed on March 7, 2008.
  15. Setdiff. MATLAB Function Reference for version 7.6, updated in 2008. Accessed on May 19, 2008.
  16. Set.S (OCaml).
  17. . GNU Octave Reference Manual
  18. PARI/GP User's Manual Archived September 11, 2015, at the Wayback Machine.
  19. PHP: array_diff, PHP Manual
  20. 1 2 . Python v2.7.3 documentation. Accessed on January 17, 2013.
  21. R Reference manual p. 410.
  22. . The Racket Reference. Accessed on May 19, 2015.
  23. Class: Array Ruby Documentation
  24. 1 2 scala.collection.Set. Scala Standard Library 2.11.7, Accessed on July 12, 2015.
  25. comm(1), Unix Seventh Edition Manual, 1979.

References

External links

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