HW3

Text-Ex. 6.1.

i) Let $M$ be a Noetherian A-module and $u : M \to M$ a module homomorphism. If $u$ is surjective, then $u$ is an isomorphism.
ii) If $M$ is Artinian and $u$ is injective, then again $u$ is an isomorphism. (For (i), consider the submodules $ker (u^{n})$ ; for (ii), the quotient modules $coker (u^{n})$ .)

\begin{proof} i) Since $u$ is surjective, $u^{n} : M \to M$ is also surjective for any $n \in N_{+}$ . Define $M_{i} = ker u_{i}$ , then we have a chain $M_{1} \subseteq M_{2} \subseteq \dots \subseteq M_{n} \subseteq \dots$ . There exists $n$ such that $M_{n} = M_{n + m}$ for any $m \in N$ as $M$ is Noetherian. It deduces that $u (m^{'}) \neq = 0$ for any nonzero $m^{'} = u^{n} (m) \in M$ . Note that $u^{n} (M) = M$ , so $u$ is injective. Therefore, $u$ is an isomorphism.

ii) Similarly, as $u^{n}$ is also injective and $M$ is Artinian, there exists $n$ such that $im (u^{n}) = im (u^{n + m})$ for any $m \in N$ . It deduces that $u^{n} ∣_{im (u^{n})}$ is an isomorphism. For any $m \neq \in im u^{n}$ , there is $u (m) \in / im u^{n}$ , otherwise there exists $m^{'} \in im u^{n}$ such that $u (m^{'}) = u (m)$ , which is impossible by $u$ injective. Thus, $m \in / im u^{n}$ yields $u (m) \neq \in im u^{n}$ and so $u^{n} \neq \in im u^{n}$ , which is a contradiction. Therefore, $M = im u^{n}$ , $u^{n}$ is an isomorphism and so $u$ is surjective. \end{proof}

Text-Ex. 6.6. Prove that the following are equivalent:

i) $X$ is Noetherian.
ii) Every open subspace of $X$ is quasi-compact.
iii) Every subspace of $X$ is quasi-compact.

\begin{proof} i)→ii) Assume that $X$ is Noetherian. For open subspace $O \subseteq X$ and its open cover $U$ , the chain $U_{1} \subseteq U_{1} \cup U_{2} \subseteq \dots \subseteq \cup_{i \in I} U_{i}$ has to stop by a.c.c. Hence $U$ has a finite subcover and so $O$ is quasi-compact.

ii)→iii) For any subspace $S \subseteq X$ and its open cover $V$ , notice that each $V \in V$ is induced from an open set $U_{V}$ with $V = S \cap U_{V}$ . Define $U = \cup_{V \in V} U_{V}$ , then $U$ is open and ${U_{V} : V \in V}$ is an open cover. There exists a finite subcover $\cup_{i = 1}^{n} U_{i} = U$ with $U_{i} = U_{V_{i}}$ for some $V_{i}$ . Then $\cup_{i = 1}^{n} V_{i} = \cup_{i = 1}^{n} (S \cap U_{i}) = S \cap U = S$ is a finite subcover of $V$ . Hence every subspace of $X$ is quasi-compact.

iii)→i) If there exists a family of open sets ${U_{i} : i \in I}$ does not satisfy a.c.c., that is, $U_{1} \subseteq U_{1} \cup U_{2} \subseteq \dots \subseteq \cup_{i \in I} U_{i} (*)$ is not stationary, then $\cup_{i \in I} U_{i}$ has an open cover $U := {U_{i} : i \in I}$ and $U$ does not have a finite subcover (Otherwise the chain $(*)$ stops at some $n$ ). It is impossible. \end{proof}

Text-Ex. 6.7. A Noetherian space is a finite union of irreducible closed subspaces. (Consider the set $Σ$ of closed subsets of $X$ which are not finite unions of irreducible closed subspaces.) Hence the set of irreducible components of a Noetherian space is finite.

\begin{proof} Let $Σ$ be the set of closed subsets of $X$ which are not finite unions of irreducible closed subspaces. Since $X$ is Noetherian, there exists a minimal element $σ$ in $Σ$ . Note that $σ$ is reducible and it can be written as a union of two closed subspace, that is, $σ = σ_{1} \cup σ_{2}$ . Since $σ$ is the minimal element in $Σ$ , both $σ_{1}$ and $σ_{2}$ can be written as finite union of irreducible closed subspaces. It deduces that $σ$ can be written as finite union of irreducible closed subspaces, which is a contradiction. \end{proof}

Proposition 2.9, (ii). Let $0 \to N^{'} \to u N \to v N^{''} (☺ \overset{◯}{R})$ be a sequence. It is exact iff for any $A$ -module $M$ , the induced sequence

0 \to Hom (M, N^{'}) \to \overline{u} Hom (M, N) \to \overline{v} Hom (M, N^{''}) (☺ \overset{◯}{R} ☺ \overset{◯}{R})

is exact.

\begin{proof} ii) "→" Assume that $(☺ \overset{◯}{R})$ is exact. It is enough to show $\overline{u}$ is injective and $ker \overline{v} = im \overline{u}$ . If $\overline{u} (f) = 0$ , then $u \circ f = 0$ . Since $u$ is injective, we have $f = 0$ and so $\overline{u}$ is injective. Note that $\overline{v} \circ \overline{u} = 0$ as $v \circ u = 0$ , so $im \overline{u} \subseteq ker \overline{v}$ . For any $g \in ker \overline{v}$ , we aim to find $f$ such that $g = f \circ u$ . For any $m \in M$ , define $f (m) = u^{- 1} (g (m))$ . Since $g (m) \in ker v = im u$ and $u$ is injective, $f$ is well-defined and $g = f \circ u$ . Hence $im \overline{u} = ker \overline{v}$ .

"←" Assume that $(☺ \overset{◯}{R} ☺ \overset{◯}{R})$ is exact. It suffices to show $u$ is injective and $ker v = im u$ . If $u$ is not injective, then $ker u \neq = 0$ . Let $M = ker u$ and apply it to $(☺ \overset{◯}{R} ☺ \overset{◯}{R})$ . The inclusion map $ι : ker u ↪ N^{'}$ is included in $Hom (M, N^{'})$ and $\overline{u} (ι) = 0$ , which contradicts with $\overline{u}$ injective. Take $M = N^{'}$ and $id_{N^{'}} \in Hom (N^{'}, N^{'})$ satisfies $\overline{v} \circ \overline{u} \circ f = v \circ u = 0$ , that is, $im u \subseteq ker v$ . Conversely, take $M = ker v$ and

0 \to Hom (ker v, N^{'}) \to \overline{u} Hom (ker v, N) \to \overline{v} Hom (ker v, N^{''})

is exact. Since $ι^{'} : ker v \to N$ is an element of $Hom (ker v, N)$ and $\overline{v} (ι^{'}) = 0$ , there is $ι^{'} \in ker \overline{v} = im \overline{u}$ and so there exists $ϕ$ such that $u \circ ϕ = ι^{'}$ . Then for any $m \in ker v$ , we have $m = ι^{'} (m) = u (ϕ (m))$ and $m \in im u$ . Now we finish the proof.
\end{proof}

Proposition 2.10. Consider a commutative diagram where both rows are short exact.

00 M^{'} f^{'} ↓ ⏐ N^{'} G g M f ↓ ⏐ N H h M^{''} f^{''} ↓ ⏐ N^{''} 00

Then we have an exact sequence

0 \to ker f^{'} \to ker f \to ker f^{''} \to coker f^{'} \to coker f \to coker f^{''} \to 0.

Prove the sequence is exact at the two places $ker f^{''}$ and $coker f^{'}$ .

\begin{proof} Notice that $ker f^{'} \to ker f \to ker f^{''}$ are restriction of $M^{'} \to M \to M^{''}$ . We can check that $g$ and $h$ induce maps $coker f^{'} \to coker f$ and $coker f \to coker f^{''}$ . So it suffices to construct $d : ker f^{''} \to coker f^{'}$ . For any $x \in M^{''}$ , take $\overset{x}{^} \in M$ and so $f (\overset{x}{^}) \in ker h$ . Then define $\overset{x}{ˇ} \in N^{'}$ such that $g (\overset{x}{ˇ}) = \overset{x}{^}$ and $\overline{\overset{x}{ˇ}} \in coker f^{'}$ is what we desired. It is easy to check this map is well-defined.

It remains to check the sequence is exact. For convenience, define

0 \to ker f^{'} \to G^{'} ker f \to H^{'} ker f^{''} \to d coker f^{'} \to g^{'} coker f \to h^{'} coker f^{''} \to 0.

For any $x \in ker d ⩽ M^{''}$ , there exists $y \in M$ such that $H (y) = x$ . By the definition of $d$ , we know $f (y) = g (d (x)) = 0$ and so $y \in ker f$ . It deduces that $x \in im (H^{'})$ . Conversely, for any $x \in im (H^{'})$ , there exists $y \in ker f$ such that $x = H^{'} (y)$ . By the definition of $d$ , there is $g (d (x)) = f (y) = 0$ and $d (x) = 0$ . Thus $x \in ker d$ . Now we have proved $ker d = im H^{'}$ .

For any $x \in ker g^{'}$ , there is $g^{'} (x) = 0$ and so $g (\overset{x}{^}) \in im f$ for any given preimage $\overset{x}{^} \in N^{'}$ . Then there is $y \in M$ such that $f (y) = g (\overset{x}{^})$ . By the definition of $d$ , we know $d (H (y)) = x$ . In addition, since $f^{''} (H (y)) = h (f (y)) = h (g (\overset{x}{^})) = 0$ , $H (y) \in ker f^{''}$ . It yields that $x \in im d$ . Conversely, for any $x \in im d$ , there exists $y$ such that $d (y) = x$ and $z \in M$ such that $H (z) = y$ and $f (z) = g (\overset{x}{^})$ for any given $x \in N^{'}$ . By the definition of $d$ , there is $g^{'} (x) = \overline{f (z)} \in coker f$ and so $g^{'} (x) = 0$ , $x \in ker g^{'}$ . Now we have proved $im d = ker g^{'}$ . \end{proof}

Text-Ex. 2.15. In the situation of Exercise 14, show that every element of $M$ can be written in the form $μ_{i} (x_{i})$ for some $i \in I$ and some $x_{i} \in M_{i}$ . Show also that if $μ_{i} (x_{i}) = 0$ then there exists $j ⩾ i$ such that $μ_{ij} (x_{i}) = 0$ in $M_{j}$ .

\begin{proof} For any $m \in M$ , let $c = (x_{i})_{i \in I}$ be the preimage of $m$ , i.e. $μ (c) = m$ . Since $c \in \oplus_{i \in I} M_{i}$ , only finitely many $x_{i} \neq = 0$ and we define $J = {i \in I : x_{i} \neq = 0}$ . Notice that for any $i ⩽ j$ , there is $μ_{i} (x_{i}) = μ_{j} \circ μ_{ij} (x_{i}) = μ_{j} (μ_{ij} (x_{i}))$ . Let $k$ be the maximal element of $J$ . Since $I$ is a direct set, $k$ is well-defined. Then for each $i \in J$ , $μ_{i} (x_{i}) = μ_{k} (μ_{ij} (x_{i}))$ and $μ_{ik} (x_{i}) \in M_{k}$ . It deduces that $m = μ_{k} (\sum_{i \in J} μ_{ik} (x_{i}))$ with $\sum_{i \in J} μ_{ik} (x_{i}) \in M_{k}$ .

If $μ_{i} (x_{i}) = 0$ , then $μ (x_{i}) = 0$ and so $x_{i} \in D = ⟨ x_{j} - μ_{jk} (x_{j}) : j ⩽ k, x_{j} \in M_{j} ⟩$ . Since $D ⩽ C = \oplus_{i \in I} M_{i}$ , either $x_{i} = y_{i} - μ_{ij} (y_{i})$ with $i ⩽ j$ or $x_{i} = z_{h} - μ_{hi} (z_{h})$ with $h ⩽ i$ . For the former case, $μ_{ij} (y_{i}) = y_{i} - x_{i} \in M_{i}$ yields that $x_{i} = y_{i}$ and $μ_{ij} (x_{i}) = μ_{ij} (y_{i}) = 0$ . For the latter one, $z_{h} = x_{i} - μ_{hi} (z_{h}) \in M_{h} \cap M_{i} = 0$ yields that $z_{h} = 0$ and $x_{i} = μ_{hi} (z_{h}) = 0$ , and then $μ_{ij} (x_{i}) = 0$ . \end{proof}

Text-Ex. 2.16. Show that the direct limit is characterized (up to isomorphism) by the following property. Let $N$ be an $A$ -module and for each $i \in I$ let $α_{i} : M_{i} \to N$ be an $A$ module homomorphism such that $α_{i} = α_{j} \circ μ_{ij}$ whenever $i ⩽ j$ . Then there exists a unique homomorphism $α : M \to N$ such that $α_{i} = α \circ μ_{i}$ for all $i \in I$ .

\begin{proof} Define $β : C \to N, (x_{i})_{i \in I} \mapsto \sum_{i \in I} α_{i} (x_{i})$ . Since $(x_{i})_{i \in I} \in C$ , only finitely many $x_{i} \neq = 0$ and $\sum_{i \in I} α_{i} (x_{i})$ makes sense. Define $α : M \to N, m \mapsto β (μ^{- 1} (m))$ . Note that $μ^{- 1} (m) = c + D$ for some $c \in μ^{- 1} (m)$ , and $β (D) = 0$ by $α_{i} = α_{j} \circ μ_{ij}$ , $i ⩽ j$ . It deduces that $α$ is well-defined. For any $i \in I$ and $x_{i} \in M_{i}$ , we have $α (μ_{i} (x_{i})) = β (x_{i}) = α_{i} (x_{i})$ and so $α_{i} = α \circ μ_{i}$ for all $i \in I$ . Now we finish the proof. \end{proof}

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