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reformulate Lem. 4.11.5 slightly to avoid implicit use of choice
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UlrikBuchholtz committed Oct 9, 2023
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Expand Up @@ -2681,14 +2681,13 @@ \section{Monomorphisms and epimorphisms}
\footcitetext{TrimbleEpisSurjective}
\end{lemma}
\begin{proof}[Proof draft.] Consider the projection $\pi : G \to G/H$ to the set of cosets.
Let $j : G/H \to A$ be an injection into an abelian group.
(We could for instance let $A$ be the free abelian group on $G/H$. [Add xref to statement that inclusion of generators in an injection.])
Let $j : G/H \to A$ be an injection into a group $A$.
(We could for instance let $A$ be the free (abelian) group on $G/H$. [Add xref to statement that inclusion of generators in an injection.])

Consider the group
Consider the group $W \defeq \Aut_E(\sh_G,\cst{\sh_A})$, where
\[
W \defeq \mkgroup \sum_{t : \BG}\bigl((\sh_G \eqto t) \to \BA\bigr),
E \defeq \sum_{t : \BG}\bigl((\sh_G \eqto t) \to \BA\bigr).
\]
with base point $(\sh_G,\cst{\sh_A})$.
We have two homomorphisms $\varphi,\psi : G \to W$ with the same underlying map,
$t \mapsto (t , \cst{\sh_A})$, but with different pointing paths:
\[
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