surjection

English

A surjection

Etymology

From French surjection, introduced by Nicolas Bourbaki in their treatise Éléments de mathématique. Ultimately borrowed from Latin superiectiō (“a throwing over or on; (fig.) an exaggeration, a hyperbole”).[1]

Pronunciation

IPA^(key): /sɜː(ɹ).dʒɛk.ʃən/

Noun

surjection (plural surjections)

(set theory) A function that is a many-to-one mapping; (formally) Any function $f:X\rightarrow Y$ $\text{[math]}$ for which for every $y\in Y$ $\text{[math]}$ , there is at least one $x\in X$ $\text{[math]}$ such that $f(x)=y$ $\text{[math]}$ .
- 1992, Rowan Garnier, John Taylor, Discrete Mathematics for New Technology, Institute of Physics Publishing, page 220,
  In some special cases, however, the number of surjections $A\rightarrow B$ can be identified.
- 1999, M. Pavaman Murthy, A survey of obstruction theory for projective modules of top rank, Tsit-Yuen Lam, Andy R. Magid (editors), Algebra, K-theory, Groups, and Education: On the Occasion of Hyman Bass's 65th Birthday, American Mathematical Society, page 168,
  Let $J=\cap _{i}m_{i}$ be the (irredundant) primary decomposition of $J$ . We associate to the pair $(J,\omega )$ the element $\textstyle \sum _{i}(m_{i},\omega _{i})\in G$ , where $\omega _{i}$ is the equivalence class of surjections from $L/m_{i}L\oplus (A/m_{i})^{n-1}$ to $m_{i}/m_{i}^{2}$ induced by $\omega$ .
- 2003, Gilles Pisier, Introduction to Operator Space Theory, Cambridge University Press, page 43,
  In Banach space theory, a mapping $u:E\rightarrow F$ (between Banach spaces) is called a metric surjection if it is onto and if the associated mapping from $E/{\text{ker}}(u)$ to $F$ is an isometric isomorphism. Moreover, by the classical open mapping theorem, $u$ is a surjection iff the associated mapping from $E/{\text{ker}}(u)$ to $F$ is an isomorphism.

Synonyms

(function that is a many-to-one mapping): surjective function

Related terms

Translations

function that is a many-to-one mapping

Czech: surjekce f
Estonian: sürjektsioon, surjection (et) f
Finnish: surjektio (fi)
French: surjection (fr) f
German: Surjektion (de) f
Ido: surjekto
Italian: suriezione (it) f
Japanese: 全射 (ja) (zensha)

Korean: 전사 (ko) (jeonsa) (全射)
Polish: suriekcja f
Portuguese: sobrejeção f
Russian: сюръе́кция (ru) f (sjurʺjékcija)
Serbo-Croatian: surjekcija (sh) f
Spanish: función sobreyectiva f
Swedish: surjektion (sv) c

References

sŭperjectĭo, Charlton T. Lewis; Charles Short [1879], A Latin Dictionary, uchicago.edu

French

Etymology

Formed after bijection and injection.

Pronunciation

IPA^(key): /syʁ.ʒɛk.sjɔ̃/

Noun

surjection f (plural surjections)

(set theory) surjection

Derived terms

surjectif

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