Notes on Cambridge Maths

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Free Group Functor

For any set , there is a Group (namely the Free Group)
which contains (a copy of)
and each function where is a group
extends uniquely to a homomorphism
We can make this into a Functor .
Given
define as the unique homomorphism
extending the composite
This is functorial:
Given ,
both and are unique homomorphisms
that extend so they’re equal

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