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Centralizers in symmetric monoidal closed categories
If M is a monoid in a symmetric monoidal closed category V with equalizers and is any morphism in V with codomain M, one can define the centralizer of f as the equalizer of the two multiplication maps induced by f.
GeoffreyT2000 (
talk) 16:39, 17 May 2015 (UTC)reply
Sentence in introduction
In the beginning, it says The centralizer and normalizer of S are subgroups of G, and can provide insight into the structure of G. Can this be made more specific? In which way do they provide insight into the structure of G? Is there a particular theorem indicating this?
Zaunlen (
talk) 15:14, 10 November 2019 (UTC)reply
This article is within the scope of WikiProject Mathematics, a collaborative effort to improve the coverage of
mathematics on Wikipedia. If you would like to participate, please visit the project page, where you can join
the discussion and see a list of open tasks.MathematicsWikipedia:WikiProject MathematicsTemplate:WikiProject Mathematicsmathematics articles
Centralizers in symmetric monoidal closed categories
If M is a monoid in a symmetric monoidal closed category V with equalizers and is any morphism in V with codomain M, one can define the centralizer of f as the equalizer of the two multiplication maps induced by f.
GeoffreyT2000 (
talk) 16:39, 17 May 2015 (UTC)reply
Sentence in introduction
In the beginning, it says The centralizer and normalizer of S are subgroups of G, and can provide insight into the structure of G. Can this be made more specific? In which way do they provide insight into the structure of G? Is there a particular theorem indicating this?
Zaunlen (
talk) 15:14, 10 November 2019 (UTC)reply