Dummit And Foote Solutions Chapter 4 Overleaf Instant

% -------------------------------------------------------------- % Title & Author % -------------------------------------------------------------- \titleSolutions to Dummit & Foote\ Chapter 4: Group Actions \authorPrepared for Overleaf \date\today

\beginsolution Let $H = N_G(P)$. By definition, $P \triangleleft H$ (since $P$ is normal in its normalizer). Hence $P$ is the unique Sylow $p$-subgroup of $H$. Now let $g \in N_G(H)$. Then $gPg^-1 \subseteq gHg^-1 = H$, so $gPg^-1$ is also a Sylow $p$-subgroup of $H$. By uniqueness, $gPg^-1 = P$. Thus $g \in N_G(P) = H$. Therefore $N_G(H) \subseteq H$, and the reverse inclusion is trivial. So $N_G(H) = H$. \endsolution

\beginsolution Fix $a \in A$. By transitivity, $A = \Orb(a)$. The Orbit-Stabilizer Theorem states: [ |\Orb(a)| = \frac. ] Thus $|A| = |G| / |\Stab_G(a)|$, so $|A| \cdot |\Stab_G(a)| = |G|$. Hence $|A|$ divides $|G|$. \endsolution

\beginsolution Consider the action of $G$ on itself by left multiplication. This gives a homomorphism $\varphi: G \to S_2n$. However, a more refined approach uses Cayley's theorem and parity. Dummit And Foote Solutions Chapter 4 Overleaf

\beginsolution Decompose $A$ into disjoint orbits. For any $a \notin \Fix(A)$, its orbit size is $|\Orb(a)| = |G|/|\Stab(a)|$. Since $G$ is a $p$-group, $|\Orb(a)|$ is a power of $p$ greater than $1$, hence divisible by $p$. For $a \in \Fix(A)$, $|\Orb(a)| = 1$. Therefore: [ |A| = \sum_\textorbits |\Orb(a)| = |\Fix(A)| + \sum_\textnon-fixed orbits (\textmultiple of p). ] Reducing modulo $p$ yields $|A| \equiv |\Fix(A)| \pmodp$. \endsolution

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\beginexercise[Section 4.5, Exercise 10] Prove that if $|G| = 12$, then $G$ has either one or four Sylow $3$-subgroups. \endexercise Now let $g \in N_G(H)$

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\beginexercise[Section 4.3, Exercise 11] Let $G$ be a group of order $p^2$ where $p$ is prime. Prove that $G$ is abelian. \endexercise Thus $g \in N_G(P) = H$

\sectionThe Class Equation and Consequences

\beginexercise[Section 4.1, Exercise 3] Let $G$ be a group and let $H \leq G$. Prove that the action of $G$ on the set of left cosets $G/H$ by left multiplication is transitive. Determine $\Stab_G(1H)$. \endexercise