surjection

Etymology
From, introduced by in their treatise . Ultimately borrowed from.

Noun

 * 1)  A function for which every element of the codomain is mapped to by some element of the domain; (formally) Any function $$f: X\rightarrow Y$$ for which for every $$y \in Y$$, there is at least one $$x \in X$$ such that $$f(x) = y$$.

Translations

 * Catalan: funció exhaustiva
 * Chinese:
 * Mandarin:
 * Czech: surjekce
 * Estonian: sürjektsioon,
 * Finnish:
 * French:
 * German:, surjektive Funktion
 * Greek:
 * Ido: surjekto
 * Italian:
 * Japanese:
 * Korean:
 * Polish: suriekcja
 * Portuguese: sobrejeção
 * Romanian: surjecție, funcție surjectivă
 * Russian:
 * Serbo-Croatian:
 * Spanish: función sobreyectiva
 * Swedish:

Etymology
Borrowing from. Compare, , with the same second element but different prefixes.