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- ...e [[algebraic structure]] of a [[field (mathematics)|field]], that is, a [[bijective function]] from the field onto itself which respects the fields operations of additi3 KB (418 words) - 12:18, 20 December 2008
- a [[bijective function|one-to-one correspondence]] between all elements of the set and all natural1 KB (214 words) - 13:35, 6 July 2009
- ...<math>\scriptstyle \mathbb{R}^n </math> (i.e. there exists a continuous [[bijective function]] from the said neighborhood, with a continuous inverse, to <math>\scriptst5 KB (805 words) - 17:01, 28 November 2008
- Many examples of groups come from considering some object and a set of [[bijective function]]s from the object to itself, which preserve some structure that this objec5 KB (819 words) - 10:52, 15 September 2009
- ...re ''isomorphic'' if there is a [[surjective function|surjective]] (thus [[bijective function|bijective]]) embedding of one into the other (then the embedding is called15 KB (2,535 words) - 20:29, 14 February 2010
- * A [[bijective function]] is one which is both surjective and injective.15 KB (2,342 words) - 06:26, 30 November 2011
- * "similar" is interpreted as [[Bijective function#Bijections and the concept of cardinality|equinumerous]].6 KB (944 words) - 08:32, 14 October 2013
- * "similar" is interpreted as [[Bijective function#Bijections and the concept of cardinality|equinumerous]].6 KB (944 words) - 15:09, 23 September 2013
- *A [[bijective function]] (or '''invertible function''') is one which is both surjective and inject17 KB (2,828 words) - 10:37, 24 July 2011