HW7

(1) Suppose $A$ is a Noetherian ring, $B = A / I$ is a quotient ring of $A$ . Show that:

(i) $B$ is a Noetherian $A$ -module.
(ii) $B$ is a Noetherian ring.

\begin{proof} i) Since $A$ is a Noetherian ring, any submodule of the $A$ -module $A$ is finitely generated. Define $π : A \to A / I$ as the canonical map. For any submodule $M$ of $B = A / I$ , there exists $C \subseteq A$ such that $π (C) = M$ and $C$ is finitely generated. Assume that $C = ⟨ a_{1}, \dots, a_{n} ⟩$ , then $M = ⟨ π (a_{1}), \dots, π (a_{n}) ⟩$ and so $M$ is finitely generated. Therefore, $B$ is a Noetherian $A$ -module.

ii) It suffices to show any submodule of $B$ -module $B$ is finitely generated. Assume that $N$ is a submodule of $B$ -module of $B$ , then for any $a \in A$ and $\overline{b} = b + I \in B$ , we have that $a (b + I) = ab + I = \overline{a} \overline{b} \in B$ and so $N$ is a submodule of $A$ -module $B$ . By i), we know $N$ is finitely generated and so $B$ is a Noetherian ring. \end{proof}

(2) Let $k$ be a field, then $k [x]$ is an Euclidean domain.

\begin{proof} Define $N : k [x] ∖ {0} \to N, f (x) \to de g f$ . Then for any $f, g \in k [x]$ , if $N (f) < N (g)$ , then $f = 0 \cdot g + f$ with $d (f) < d (g)$ . Now we assume that $N (f) ⩾ N (g)$ . It deduces that $f (x)$ can be written as $f (x) = h (x) g (x) + r (x)$ where $de g h g = de g f$ and $de g r < de g g$ . Hence, the quotient is $h$ and the remainder is $r$ , where $N (r) < N (g)$ . Therefore, $k [x]$ is an Euclidean domain. \end{proof}

(3) Find an example, where $A$ is a Noetherian ring, $B \subset A$ is a subring, but $B$ is NOT a Noetherian ring.

\begin{proof} Let $A = R [x_{1}, x_{2}]$ , then $A$ is a Noetherian ring. Let $B$ be the subring generated by ${x y^{i} : i ⩾ 0}$ . Then $B$ is not a Noetherian ring, because $B$ is not finitely generated.

Alternating proof. Let $B = k [x_{1}, x_{2}, \dots, x_{n}, \dots]$ and $A$ be the fractional field of $B$ . \end{proof}

(4) Let $M$ be a Noetherian $A$ -module and $u : M \to M$ a module homomorphism. If $u$ is surjective, then $u$ is an isomorphism. (Hint: consider the submodules $ker (u^{n})$ .)

\begin{proof} Since $u$ is a module homomorphism, $u^{n} : M \to M$ is also a module homomorphism for all $n \in N_{+}$ . It follows that $ker (u^{n})$ is a submodule of $M$ for all $n \in N_{+}$ . Since

ker (u) \subseteq ker (u^{2}) \subseteq \dots \subseteq ker (u^{n}) \subseteq \dots

and $M$ is Noetherian, there exists $k$ such that $ker (u^{k}) = ker (u^{k + 1})$ . For any non-zero $m \in N$ , there is $m^{'}$ such that $u^{k} (m^{'}) = m$ as $u$ is surjective. If $u (m) = 0$ , then $m^{'} \in ker (u^{k + 1}) ∖ ker (u^{k})$ , which is impossible. Therefore, $u (m) \neq = 0$ for any non-zero $m \in N$ and so $u$ is an isomorphism. \end{proof}

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