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definition:kernel_of_a_group_homomorphism
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Table of Contents
Kernel of a Group Homomorphism
Definition
Let $f:G\to H$ be a group homomorphism. The kernel of $f$ is the collection of elements of $G$ that map to the indentity $e_H$ element of $H$. In set notation, we write $$\ker f = \{ g\in G\mid f(g)=e_H\}.$$
Remarks
- I plan to introduce the kernel of a homorphism at the same time as introducing as introducing collapsible subgraphs. I plan to introduce this idea before introducing normal subgroups, and use the kernel to discover the definition of a normal subgroup.
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External links
- http://en.wikipedia.org/wiki/Kernel_(algebra)#Group_homomorphisms
definition ben needsreview
definition/kernel_of_a_group_homomorphism.1376494279.txt.gz · Last modified: 2013/08/14 11:31 by bmwoodruff
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