replace \E -> \exists

2021_Algebra_I.tex

@@ -45,7 +45,7 @@ Fields which are not assumed to be algebraically closed have been renamed (usual
     \end{enumerate}
 
     This subset of $N \subseteq M$ is called the \vocab[Module!Submodule]{submodule of $M $ generated by $S$}. If $N= M$ we say that  \vocab[Module!generated by subset $S$]{$ M$ is generated by $S$}.
-    $M$ is finitely generated $:\iff \E S \subseteq M$ finite such that $M$ is generated by $S$.
+    $M$ is finitely generated $:\iff \exists S \subseteq M$ finite such that $M$ is generated by $S$.
 \end{definition}
 
 \begin{definition}[Noetherian $R$-module]
@@ -176,7 +176,7 @@ This generalizes some facts about matrices to matrices with elements from commut
 \begin{proposition}[on integral elements]\label{propinte}
     Let $A$ be an $R$-algebra, $a \in A$. Then the following are equivalent:
     \begin{enumerate}[A]
-        \item $\E n \in \N, (r_i)_{i=0}^{n-1}, r_i \in R: a^n = \sum_{i=0}^{n-1} r_i a^i$
+        \item $\exists n \in \N, (r_i)_{i=0}^{n-1}, r_i \in R: a^n = \sum_{i=0}^{n-1} r_i a^i$
         \item  There exists a subalgebra  $B \subseteq A$ finite over $R$ and containing $a$.
     \end{enumerate}
     If $a_1, \ldots, a_k \in A$ satisfy these conditions, there is a  subalgebra of $A$ finite over $R$ and containing all $a_i$.
@@ -223,7 +223,7 @@ This generalizes some facts about matrices to matrices with elements from commut
             From B it follows, that the integral closure is closed under ring operations.
         \item[S] trivial
         \item[T] Let $b \in B$ such that $b^n = \sum_{i=0}^{n-1} a_ib^{i}$. Then there is a subalgebra $\tilde{A} \subseteq A$ finite over $R$, such that all $a_i \in \tilde{A}$.
-            $b$ is integral over $\tilde{A} \implies \E \tilde{B} \subseteq B$ finite over $\tilde{A}$ and  $b \in \tilde{B}$. Since  $\tilde{B} / \tilde{A} $ and  $\tilde{A} / R$ are finite, $\tilde{B} / R$ is finite and $b$ satisfies B.
+            $b$ is integral over $\tilde{A} \implies \exists \tilde{B} \subseteq B$ finite over $\tilde{A}$ and  $b \in \tilde{B}$. Since  $\tilde{B} / \tilde{A} $ and  $\tilde{A} / R$ are finite, $\tilde{B} / R$ is finite and $b$ satisfies B.
     \end{enumerate}
 \end{proof}
 
@@ -251,7 +251,7 @@ This generalizes some facts about matrices to matrices with elements from commut
     Let $B$ be a field and $a \in A \sm \{0\} $. Then $a\inv \in  B$ is integral over $A$, hence $a^{-d} = \sum_{i=0}^{d-1} \alpha_i a^{-i}$ for some $\alpha_i \in A$. Multiplication by $a^{d-1}$ yields
     $a\inv = \sum_{i=0}^{d-1} \alpha_i a^{d-1-i} \in A$.
 
-    On the other hand, let $B$ be integral over the field $A$. Let $b \in  B \sm \{0\}$. As $B$ is integral over $A$, there is a sub-$A$-algebra $\tilde{B} \subseteq B, b \in \tilde{B}$ finitely generated as an $A$-module, i.e. a finite-dimensional  $A$-vector space.  Since $B$ is a domain, $\tilde{B} \xrightarrow{b\cdot } \tilde{B}$ is injective, hence surjective, thus $\E x \in \tilde{B} : b \cdot  x \cdot  1$.
+    On the other hand, let $B$ be integral over the field $A$. Let $b \in  B \sm \{0\}$. As $B$ is integral over $A$, there is a sub-$A$-algebra $\tilde{B} \subseteq B, b \in \tilde{B}$ finitely generated as an $A$-module, i.e. a finite-dimensional  $A$-vector space.  Since $B$ is a domain, $\tilde{B} \xrightarrow{b\cdot } \tilde{B}$ is injective, hence surjective, thus $\exists x \in \tilde{B} : b \cdot  x \cdot  1$.
 \end{proof}
 \subsection{Noether normalization theorem}
 \begin{lemma}\label{nntechlemma}
@@ -474,8 +474,8 @@ As $\Va(0) = \mathfrak{k}$ and $\Va(P)$ finite for $P \neq 0$ and $\{x_1,\ldots,
 \begin{definition}
     Let $X$ be a topological space. $X$ satisfies the separation properties $T_{0-2}$ if for any $x \neq  y \in X$ 
     \begin{enumerate}
-        \item[$T_0$ ] $\E U \subseteq X$ open such that $|U \cap \{x,y\}| = 1$
-        \item[$T_1$ ] $\E U \subseteq X$ open such that $x \in U, y \not\in U$.
+        \item[$T_0$ ] $\exists U \subseteq X$ open such that $|U \cap \{x,y\}| = 1$
+        \item[$T_1$ ] $\exists U \subseteq X$ open such that $x \in U, y \not\in U$.
         \item[$T_2$ ] There are disjoined open sets $U, V \subseteq X$ such that $x \in U, y \in V$. (Hausdorff)
     \end{enumerate}
 \end{definition}
@@ -981,7 +981,7 @@ Let $R = \mathfrak{k}[X_1,\ldots,X_n]$.
     \begin{figure}[H]
         \centering
         \begin{tikzcd}
-            R \arrow{r}{i}\arrow{d}{j}& R_S \arrow[dotted]{ld}{\Eone \iota}\\
+            R \arrow{r}{i}\arrow{d}{j}& R_S \arrow[dotted]{ld}{\existsone \iota}\\
             T 
         \end{tikzcd}
     \end{figure}
@@ -990,7 +990,7 @@ Let $R = \mathfrak{k}[X_1,\ldots,X_n]$.
 \begin{proof}
     The construction is similar to the construction of the field of quotients:
 
-    Let $R_S \coloneqq (R \times S) / \sim $, where $(r,s) \sim (\rho, \sigma) : \iff \E t \in  S ~ t \sigma r = ts\rho$.\footnote{$t$ does not appear in the construction of the field of quotients, but is important if $S$ contains zero divisors.}
+    Let $R_S \coloneqq (R \times S) / \sim $, where $(r,s) \sim (\rho, \sigma) : \iff \exists t \in  S ~ t \sigma r = ts\rho$.\footnote{$t$ does not appear in the construction of the field of quotients, but is important if $S$ contains zero divisors.}
         $[r,s] + [\rho, \sigma] \coloneqq [r\sigma + \rho s, s \sigma]$, $[r,s] \cdot [\rho, \sigma] \coloneqq [r \cdot \rho, s \cdot  \sigma]$.
         
         In order proof the universal property define $\iota([r,s]) \coloneqq \frac{j(r)}{j(s)}$.
@@ -998,7 +998,7 @@ Let $R = \mathfrak{k}[X_1,\ldots,X_n]$.
 
 \end{proof}
 \begin{remark}
-    $i$ is often not injective and $\Ker(i) = \{r \in R | \E s \in S ~ s \cdot r = 0\} $.
+    $i$ is often not injective and $\Ker(i) = \{r \in R | \exists s \in S ~ s \cdot r = 0\} $.
     In particular $(r = 1)$, $R_S$ is the null ring iff $0 \in S$.
 \end{remark}
 \begin{notation}
@@ -1085,8 +1085,8 @@ Because the elements of $S$ become units in $R_S$, $J \sqcap R$ is an $S$-satura
     \centering
     \begin{tikzcd}
         R \arrow{r}{\tau}\arrow[swap]{d}{\pi_{R,I}}& T &  R\arrow[swap]{l}{\tau}\arrow{d}{}\\
-        R / I \arrow[dotted]{ru}{\Eone \tau_1}\arrow{d}{} & & R_S \arrow[dotted, swap]{lu}{\Eone \tau_3}\arrow{d}{\pi_{R_S, I_S}}\\
-        (R / I)_{\overline{S}} \arrow[dotted,bend right]{ruu}{\Eone \tau_2} & & R_S / I_S \arrow[dotted, bend left, swap]{luu}{\Eone \tau_4}\\
+        R / I \arrow[dotted]{ru}{\existsone \tau_1}\arrow{d}{} & & R_S \arrow[dotted, swap]{lu}{\existsone \tau_3}\arrow{d}{\pi_{R_S, I_S}}\\
+        (R / I)_{\overline{S}} \arrow[dotted,bend right]{ruu}{\existsone \tau_2} & & R_S / I_S \arrow[dotted, bend left, swap]{luu}{\existsone \tau_4}\\
     \end{tikzcd}
 \end{figure}
 
@@ -1148,7 +1148,7 @@ Then \[
     \[
         c + \trdeg(\fK(X) / \mathfrak{k}) = c + \trdeg(\mathfrak{k}(\fp_0) / \mathfrak{k}) \le  \trdeg(\mathfrak{k}(\fp_c) / \mathfrak{k}) = \trdeg(\fK(Y) / \mathfrak{k})
     \]
-    As $\codim(X,Y) = \sup \{c \in \N | \E X = X_0 \subsetneq \ldots \subsetneq X_c = Y \text{ irreducible, closed}\}$ it follows that
+    As $\codim(X,Y) = \sup \{c \in \N | \exists X = X_0 \subsetneq \ldots \subsetneq X_c = Y \text{ irreducible, closed}\}$ it follows that
     $$\codim(X,Y) \le \trdeg(\fK(Y) / \mathfrak{k}) - \trdeg(\fK(X) / \mathfrak{k})$$
 \end{proof}
 \begin{corollary}\label{upperbounddim}
@@ -1282,7 +1282,7 @@ Many questons of commutative algebra are easier in the case of local rings. Loca
             \begin{figure}[H]
                 \centering
                 \begin{tikzcd}
-            R \arrow{r}{\rho}\arrow[hookrightarrow]{d}{\subseteq}&  R_\fp \arrow[hookrightarrow, dotted]{d}{\Eone i}\\
+            R \arrow{r}{\rho}\arrow[hookrightarrow]{d}{\subseteq}&  R_\fp \arrow[hookrightarrow, dotted]{d}{\existsone i}\\
                     A \arrow{r}{\alpha} & A_\fp
                 \end{tikzcd}
             \end{figure}
@@ -1412,7 +1412,7 @@ Recall the definition of a normal field extension in the case of finite field ex
 
 \begin{proposition}\label{characfixnormalfe}
     Let $L / K$ be a normal field extension. If the characteristic of the fields is $O$, then $L^{\Aut( L / K)} = K$.
-    If the characteristic is $p > 0$, then $L^{\Aut(L / K)} = \{l \in L | \E n \in \N ~ l^{p^n} \in K\}$. 
+    If the characteristic is $p > 0$, then $L^{\Aut(L / K)} = \{l \in L | \exists n \in \N ~ l^{p^n} \in K\}$. 
 \end{proposition}
 \begin{proof}
     In both cases $L^G \supseteq$ is easy to see.
@@ -1730,7 +1730,7 @@ From the fact about integrality and fields (\ref{fintaf}), it follows that $A_1
 \end{notation}
 
 \begin{proposition}[Nil radical]
-    For a ring $A$, $\bigcap_{\fp \in \Spec A}  \fp = \sqrt{\{0\} } = \{a \in A | \E k \in \N ~ a^k = 0\} \text{\reflectbox{$\coloneqq$}} \nil(A)$, the set of nilpotent elements of $A$.
+    For a ring $A$, $\bigcap_{\fp \in \Spec A}  \fp = \sqrt{\{0\} } = \{a \in A | \exists k \in \N ~ a^k = 0\} \text{\reflectbox{$\coloneqq$}} \nil(A)$, the set of nilpotent elements of $A$.
     This is called the \vocab{nil radical} of $A$. 
 \end{proposition}
 \begin{proof}
@@ -2661,7 +2661,7 @@ If $X$ is a set, then $\cB \subseteq \cP(X)$ is a base for some topology on $X$
     \begin{figure}[H]
         \centering
         \begin{tikzcd}
-            \cO_X(X) \arrow{d}{\cdot |_U}\arrow{r}{x \mapsto \frac{x}{1}} & \cO_X(X)_\lambda \arrow[dotted, bend left]{dl}{\Eone \phi} \\
+            \cO_X(X) \arrow{d}{\cdot |_U}\arrow{r}{x \mapsto \frac{x}{1}} & \cO_X(X)_\lambda \arrow[dotted, bend left]{dl}{\existsone \phi} \\
             \cO_X(U) &
         \end{tikzcd}
         \hspace{50pt}
@@ -2769,7 +2769,7 @@ If $X$ is a set, then $\cB \subseteq \cP(X)$ is a base for some topology on $X$
     \begin{figure}[H]
         \centering
         \begin{tikzcd}
-            A \arrow{r}{} \arrow{d}{\lambda \mapsto \lambda_x} & A_{\mathfrak{m}_x} \arrow[dotted, bend left]{ld}{\Eone \iota} \\
+            A \arrow{r}{} \arrow{d}{\lambda \mapsto \lambda_x} & A_{\mathfrak{m}_x} \arrow[dotted, bend left]{ld}{\existsone \iota} \\
             \cO_{X,x}
         \end{tikzcd}
     \end{figure}
@@ -2858,7 +2858,7 @@ For $s_1 \neq s_2$, % TODO
 
 Noether normalization: 
 $a_i \in A$ minimal  such that $A$ is integral over the subalgebra genereted by the $a_i$.
-Suppose $\E P \in K[X_1,\ldots,X_n] \sm \{ 0\} ~ P(a_1,\ldots,a_n) = 0$. $P = \sum_{\alpha \in \N^n} p_\alpha X^\alpha, S \coloneqq \{ \alpha \in  \N^n | p_\alpha \neq 0\}$.
+Suppose $\exists P \in K[X_1,\ldots,X_n] \sm \{ 0\} ~ P(a_1,\ldots,a_n) = 0$. $P = \sum_{\alpha \in \N^n} p_\alpha X^\alpha, S \coloneqq \{ \alpha \in  \N^n | p_\alpha \neq 0\}$.
 Choose $k$ as in the lemma.
 $b_i \coloneqq a_{i+1} - a_1^{k_{i+1}}, 1 \le i <n$. Claim: $A$ is integral ober subalgebra $B$ generated by the $b_i$ ($\lightning$ minimality)
 $Q(T) \coloneqq P(T, b_1 + T^{k_2}, \ldots, b_{n-1} + T^{k_n})$. $Q(a_1) = P(\vec a) = 0$.
@@ -2912,7 +2912,7 @@ Then $\Aut(L / K)$ transitively acts on $\{\fq \in \Spec B | \fq \cap A = \fp\}$
     \item only need to show $\fq \subseteq \sigma(\fr)$ for some  $\sigma \in G$ (Krull going-up, no inclusions)
     \item Suppose not. Then  $x \in \fq \sm \bigcup_{\sigma \in G}  \sigma(\fr)$ (prime aviodance)
     \item $y = \prod_{\sigma \in G} \sigma(x) \in \fq \sm \fr$ ($\fr$ prime ideal)
-    \item $\E k \in \N$ s.t. $y^k \in K$ ($y \in L^G$)
+    \item $\exists k \in \N$ s.t. $y^k \in K$ ($y \in L^G$)
     \item $y^k \in K \cap B = A $ ($A$ normal). Thus $y^k \in (A \cap \fq) \sm (A \cap \fr) = \fp \sm \fp$.
     \item  $L / K$ infinite: Apply Zorn to pairs $(M, \sigma)$ where $K \subseteq M \subseteq L$ and $\sigma \in \Aut(M /K)$ s.t. $\sigma(\fr \cap M) = \fq \cap M$.
 \end{itemize}