bijection

== English == === Etymology === From French bijection, introduced by Nicolas Bourbaki in their treatise Éléments de mathématique. === Pronunciation === IPA(key): /baɪˈd͡ʒɛk.ʃən/ === Noun === bijection (plural bijections) (set theory) A one-to-one correspondence, a function which is both a surjection and an injection. ==== Synonyms ==== bijective function one-to-one correspondence ==== Related terms ==== injection surjection ==== Translations ==== === Anagrams === objicient == French == === Etymology === From Latin bi- + iaciō. === Pronunciation === IPA(key): /bi.ʒɛk.sjɔ̃/ === Noun === bijection f (plural bijections) (set theory) bijection