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Line 1: {{Short description\|Mathematical concept}} {{Other uses\|Univalent (disambiguation){{!}}Univalent}} In [[mathematics]], in the branch of [[complex analysis]], a [[holomorphic function]] on an [[open subset]] of the [[complex plane]] is called '''univalent''' if it is [[Injective function\|injective]].<ref>{{harv\|Conway\|1995\|page=32\|loc=chapter 14: Conformal equivalence for simply connected regions, Definition 1.12: "A function on an open set is ''univalent'' if it is analytic and one-to-one."}}</ref><ref>{{harv\|Nehari\|1975}}</ref>

Univalent function: Difference between revisions