# Reflexive relation

In mathematics, a binary relation *R* over a set *X* is **reflexive** if every element of *X* is related to itself.^{[1]}^{[2]}

In mathematical notation, this is:

An example of a reflexive relation is the relation "is equal to" on the set of real numbers, since every real number is equal to itself. A reflexive relation is said to have the **reflexive property** or is said to possess **reflexivity**.

## Related terms

A relation that is **irreflexive**, or anti-reflexive, is a binary relation on a set where no element is related to itself. An example is the "greater than" relation (x>y) on the real numbers. Note that not every relation which is not reflexive is irreflexive; it is possible to define relations where some elements are related to themselves but others are not (i.e., neither all nor none are). For example, the binary relation "the product of *x* and *y* is even" is reflexive on the set of even numbers, irreflexive on the set of odd numbers, and neither reflexive nor irreflexive on the set of natural numbers.

A relation ~ on a set *S* is called **quasi-reflexive** if every element that is related to some element is also related to itself, formally: if ∀*x*,*y*∈*S*: *x*~*y* ⇒ *x*~*x* ∧ *y*~*y*. An example is the relation "has the same limit as" on the set of sequences of real numbers: not every sequence has a limit, and thus the relation is not reflexive, but if a sequence has the same limit as some sequence, then it has the same limit as itself.

The **reflexive closure** ≃ of a binary relation ~ on a set *S* is the smallest reflexive relation on *S* that is a superset of ~. Equivalently, it is the union of ~ and the identity relation on *S*, formally: (≃) = (~) ∪ (=). For example, the reflexive closure of *x*<*y* is *x*≤*y*.

The **reflexive reduction**, or **irreflexive kernel**, of a binary relation ~ on a set *S* is the smallest relation ≆ such that ≆ shares the same reflexive closure as ~. It can be seen in a way as the opposite of the reflexive closure. It is equivalent to the complement of the identity relation on *S* with regard to ~, formally: (≆) = (~) \ (=). That is, it is equivalent to ~ except for where *x*~*x* is true. For example, the reflexive reduction of *x*≤*y* is *x*<*y*.

## Examples

**Examples of reflexive relations include:**

- "is equal to" (equality)
- "is a subset of" (set inclusion)
- "divides" (divisibility)
- "is greater than or equal to"
- "is less than or equal to"

**Examples of irreflexive relations include:**

- "is not equal to"
- "is coprime to" (for the integers>1, since 1 is coprime to itself)
- "is a proper subset of"
- "is greater than"
- "is less than"

## Number of reflexive relations

The number of reflexive relations on an *n*-element set is 2^{n2−n}.^{[3]}

Number of n-element binary relations of different types | ||||||||
---|---|---|---|---|---|---|---|---|

n | all | transitive | reflexive | preorder | partial order | total preorder | total order | equivalence relation |

0 | 1 | 1 | 1 | 1 | 1 | 1 | 1 | 1 |

1 | 2 | 2 | 1 | 1 | 1 | 1 | 1 | 1 |

2 | 16 | 13 | 4 | 4 | 3 | 3 | 2 | 2 |

3 | 512 | 171 | 64 | 29 | 19 | 13 | 6 | 5 |

4 | 65536 | 3994 | 4096 | 355 | 219 | 75 | 24 | 15 |

n | 2^{n2} | 2^{n2-n} | Σnk=0 k! S(n,k) | n! | Σnk=0 S(n,k) | |||

OEIS | A002416 | A006905 | A053763 | A000798 | A001035 | A000670 | A000142 | A000110 |

## Philosophical logic

Authors in philosophical logic often use deviating designations.
A reflexive and a quasi-reflexive relation in the mathematical sense is called a **totally reflexive** and a **reflexive** relation in philosophical logic sense, respectively.^{[4]}^{[5]}

## See also

## Notes

- ↑ Levy 1979:74
- ↑ Relational Mathematics, 2010
- ↑ On-Line Encyclopedia of Integer Sequences A053763
- ↑ Alan Hausman; Howard Kahane; Paul Tidman (2013).
*Logic and Philosophy — A Modern Introduction*. Wadsworth. ISBN 1-133-05000-X. Here: p.327-328 - ↑ D.S. Clarke; Richard Behling (1998).
*Deductive Logic — An Introduction to Evaluation Techniques and Logical Theory*. University Press of America. ISBN 0-7618-0922-8. Here: p.187

## References

- Levy, A. (1979)
*Basic Set Theory*, Perspectives in Mathematical Logic, Springer-Verlag. Reprinted 2002, Dover. ISBN 0-486-42079-5 - Lidl, R. and Pilz, G. (1998).
*Applied abstract algebra*, Undergraduate Texts in Mathematics, Springer-Verlag. ISBN 0-387-98290-6 - Quine, W. V. (1951).
*Mathematical Logic*, Revised Edition. Reprinted 2003, Harvard University Press. ISBN 0-674-55451-5 - Gunther Schmidt, 2010.
*Relational Mathematics*. Cambridge University Press, ISBN 978-0-521-76268-7.

## External links

- Hazewinkel, Michiel, ed. (2001), "Reflexivity",
*Encyclopedia of Mathematics*, Springer, ISBN 978-1-55608-010-4