Math 360, Fall 2015, Assignment 8
From cartan.math.umb.edu
Do not imagine that mathematics is hard and crabbed and repulsive to commmon sense. It is merely the etherealization of common sense.
- - Lord Kelvin
Carefully define the following terms, then give one example and one non-example of each:[edit]
- Transposition (or swap).
- Even permutation.
- Odd permutation.
- Sign (of a permutation).
- Alternating group.
- Left congruence (on a group $G$ with respect to a subgroup $H$).
- Left coset (of $H$ by $x$).
- Right congruence.
- Right coset.
- Normal subgroup.
Carefully state the following theorems (you need not prove them):[edit]
- Theorem concerning generation of $S_n$ by cycles.
- Theorem concerning generation of $S_n$ by transpositions.
- Theorem concerning the sign of a permutation.
- Theorem concerning the order of the alternating group.
Solve the following problems:[edit]
- Section 9, problems 11 and 24.
- Section 10, problems 1, 3, 6, 20, 21, 22, 23, and 24.
- Let $G$ be a group, and let $H$ be a subgroup of $G$. Prove that $H$ is normal if and only if, for every $x\in G$ and every $h\in H$, the element $xhx^{-1}$ also lies in $H$. (In this case one says that $H$ is closed under conjugation by elements of $G$.)
- In class we showed that the subgroup $\langle(12)\rangle\leq S_3$ is not normal in $S_3$. Show by explicit example that it violates the criterion you proved above.
