Math 361, Spring 2022, Assignment 1

Read:

1. Section 14.

Carefully define the following terms, then give one example and one non-example of each:

1. $H\leq G$
2. $H\trianglelefteq G$.
3. Coset multiplication (when $H\trianglelefteq G$).
4. Canonical projection (from $G$ onto $G/H$).

Carefully state the following theorems (you do not need to prove them):

1. Theorem characterizing when coset multiplication is well-defined.
2. Theorem concerning the properties of coset multiplication ("When $H\trianglelefteq G$, coset multiplication turns $G/H$ into a...").
3. Theorem describing the kernel of the canonical projection.
4. Fundamental Theorem of Homomorphisms.

Solve the following problems:

1. Make an operation table for the quotient group $\mathbb{Z}_{12}/\left\langle 4\right\rangle$.
2. Section 14, problems 1, 9, 24, 30 (hint: in December we used Lagrange's Theorem to prove that for any finite group $G$ and any $g\in G$, one always has $g^{\left\lvert G\right\rvert}=e$; now apply similar reasoning to the group $G/H$), and 31.
3. Consider the group $D_4$ of symmetries of a square; for purposes of this problem we will use the notation introduced on page 80 of the text. Let $H$ denote the subgroup $\left\langle\delta_1,\delta_2\right\rangle$ generated by reflections in the diagonals. Determine whether $H$ is a normal subgroup of $D_4$. If it is a normal subgroup, then write the operation table for the quotient group $D_4/H$. (Warning: normality can be checked by brute force, but this is very tedious and there is a shorter way. In the next problem you will actually need the brute-force check but it will be much shorter.)
4. Repeat the above exercise for the subgroup $\left\langle\delta_1\right\rangle$ generated by $\delta_1$ alone.
5. Let $\pi:\mathbb{Z}_{12}\rightarrow\mathbb{Z}_{12}/\left\langle 4\right\rangle$ denote the canonical projection. Write the table of values for $\pi$.
6. Let $G$ be any group. Prove that the trivial subgroup $\{e\}$ is normal in $G$. Then prove that the quotient group $G/\{e\}$ is isomorphic to $G$ itself. (Hint: you need to show that the canonical projection is injective in this case.)
7. Let $G$ be any group. Prove that the improper subgroup $G$ is normal in $G$. Then write the operation table for the quotient group $G/G$.
8. Recall that $\mathbb{R}^*$ denotes the set of non-zero real numbers, regarded as a group under ordinary multiplication, and let $\phi:S_n\rightarrow\mathbb{R}^*$ denote the sign homomorphism that takes even permutations to $1$ and odd permutations to $-1$. Compute $\ker(\phi)$, write an operation table for the quotient group $S_n/\ker(\phi)$, and give a table of values for the momomorphism $\widehat{\phi}:S_n/\ker(\phi)\rightarrow\mathbb{R}^*$ whose existence is asserted by the Fundamental Theorem.

Questions:

Solutions:

Definitions:

1. $H\leq G$: $H$ is a subgroup of $G$.
2. $H\trianglelefteq G$: H is a normal subgroup of G. (When $\sim_{l,H}$ and $\sim_{r,H}$ are the same relation: if $\forall g \in G, \forall h \in H, ghg^{-1} \in H$
3. Coset multiplication (when $H\trianglelefteq G):(g_{1}H)(g_{2}H) = (g_{1}g_{2})H$.
4. Canonical projection (from $G$ onto $G/H$): Suppose $H\trianglelefteq G$. Define $\pi : G \rightarrow G/H$ as follows: $\pi (a) = aH$. Then $\pi$ is an epimorphism.

Theorems:

1. Theorem characterizing when coset multiplication is well-defined: If H is a normal subgroup of G, Then coset multiplication is well-defined.
2. Theorem concerning the properties of coset multiplication ("When $H\trianglelefteq G$, coset multiplication turns $G/H$ into a...").
3. Theorem describing the kernel of the canonical projection.
4. Fundamental Theorem of Homomorphisms.

Problems: