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\subsection*Problem S4.1 \textitClassify all groups of order 8 up to isomorphism.
\beginsolution Let $|H| = n$ and suppose $H$ is the only subgroup of $G$ with order $n$. For any $g \in G$, consider $gHg^-1$. Conjugation is an automorphism of $G$, so $|gHg^-1| = |H| = n$. Thus $gHg^-1$ is also a subgroup of $G$ of order $n$. By uniqueness, $gHg^-1 = H$ for all $g \in G$. Hence $H \trianglelefteq G$. \endsolution Dummit And Foote Solutions Chapter 4 Overleaf High Quality
\subsection*Exercise 4.4.7 \textitShow that $\Aut(\Z/8\Z) \cong \Z/2\Z \times \Z/2\Z$.
\subsection*Exercise 4.5.9 \textitLet $G$ be a finite group and let $H$ be a subgroup of $G$ with $
\subsection*Exercise 4.8.3 \textitShow that $\Inn(G) \cong G/Z(G)$. Conjugation is an automorphism of $G$, so $|gHg^-1|
\beginsolution Recall: \beginitemize \item Centralizer: $C_G(H) = \ g \in G \mid gh = hg \ \forall h \in H \$. \item Normalizer: $N_G(H) = \ g \in G \mid gHg^-1 = H \$. \enditemize If $g \in C_G(H)$, then for all $h \in H$, $ghg^-1 = h \in H$, so $gHg^-1 = H$. Hence $g \in N_G(H)$. Therefore $C_G(H) \subseteq N_G(H)$. Both are subgroups of $G$, so $C_G(H) \le N_G(H)$. \endsolution
Divisors of 12: $1,2,3,4,6,12$. The subgroups are: \beginalign* &\langle 0 \rangle = \0\ \quad \text(order 1)\\ &\langle 6 \rangle = \0,6\ \quad \text(order 2)\\ &\langle 4 \rangle = \0,4,8\ \quad \text(order 3)\\ &\langle 3 \rangle = \0,3,6,9\ \quad \text(order 4)\\ &\langle 2 \rangle = \0,2,4,6,8,10\ \quad \text(order 6)\\ &\langle 1 \rangle = \Z_12 \quad \text(order 12) \endalign*
\subsection*Exercise 4.3.12 \textitProve that if $H$ is the unique subgroup of a finite group $G$ of order $n$, then $H$ is normal in $G$. Hence $H \trianglelefteq G$
\beginsolution Define $\phi: G \to \Aut(G)$ by $\phi(g) = \sigma_g$ where $\sigma_g(x) = gxg^-1$. The image is $\Inn(G)$. Kernel: $\phi(g) = \textid_G$ iff $gxg^-1=x$ for all $x\in G$ iff $g \in Z(G)$. By the first isomorphism theorem, \[ G / Z(G) \cong \Inn(G). \] \endsolution
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