identity element

English

Noun

identity element (plural identity elements)

1. (algebra) An element of an algebraic structure which when applied, in either order, to any other element via a binary operation yields the other element.
   • 1990, Daniel M. Fendel, Diane Resek, Foundations of Higher Mathematics, Volume 1, Addison-Wesley, page 269:

     Therefore the number ${\displaystyle 0}$ is not considered an identity element for subtraction, even though ${\displaystyle x-0=x}$ for all ${\displaystyle x}$, since ${\displaystyle 0-x\neq x}$.

   • 2003, Houshang H. Sohrab, Basic Real Analysis, Birkhäuser, page 17,

     Let ${\displaystyle (G,\cdot )}$ be a group. Then the identity element ${\displaystyle e\in G}$ is unique. […]

     Proof. If ${\displaystyle e}$ and ${\displaystyle e'}$ are both identity elements, then we have ${\displaystyle ee'=e}$ since ${\displaystyle e'}$ is an identity element, and ${\displaystyle ee'=e'}$ since ${\displaystyle e}$ is an identity element. Thus

     ${\displaystyle e=ee'=e'}$.

   • 2015, Martyn R. Dixon, Leonid A. Kurdachenko, Igor Ya. Subbotin, An Introduction to Essential Algebraic Structures, Wiley, page 41:

     Sometimes, to avoid ambiguity, we may use the notation ${\displaystyle e_{M}}$ for the identity element of ${\displaystyle M}$.
     If multiplicative notation is used then we use the term identity element, and often use the notation ${\displaystyle 1}$, or ${\displaystyle 1_{M}}$, for the neutral element ${\displaystyle e}$.

Usage notes

For binary operation ${\displaystyle *}$ defined on a given algebraic structure, an element ${\displaystyle i}$ is:

1. a left identity if ${\displaystyle i*x=x}$ for any ${\displaystyle x}$ in the structure,
2. a right identity, ${\displaystyle x*i=x}$ for any ${\displaystyle x}$ in the structure,
3. simply an identity element or (for emphasis) a two-sided identity if both are true.

Where a given structure ${\displaystyle M}$ is equipped with an operation called addition, the notation ${\displaystyle 0_{M}}$ may be used for the additive identity. Similarly, the notation ${\displaystyle 1_{M}}$ denotes a multiplicative identity.

Synonyms

• (element that when applied with a binary operation leaves any other element unchanged): identity, neutral element

Hyponyms

• (element that when applied with a binary operation leaves any other element unchanged): additive identity, multiplicative identity, zero, zero element

Related terms

• left identity
• right identity

Translations

member of a structure

• Dutch: identiteit (nl) f
• Finnish: identiteettialkio
• Hebrew: איבר יחידה m
• Hungarian: egységelem (hu)
• Irish: ball ionannais m
• Italian: elemento neutro m
• Maori: tūmau
• Russian: то́ждество (ru) n (tóždestvo), тожде́ственность (ru) f (toždéstvennostʹ)
• Spanish: elemento neutro m
• Swedish: identitetselement (sv) n

See also

• unity

Further reading

• Identity matrix on Wikipedia.
• Inverse element on Wikipedia.