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| \documentclass{../../../lecture} | |||
| \usepackage{enumerate} | |||
| \begin{document} | |||
| \begin{aufgabe} | |||
| Es sei $K$ Körper, $M$ eine Menge und $m_0 \in M$ ein fest gewähltes | |||
| Element. In \\$V = \text{Abb}(M, K)$ betrachten wir die Teilmengen | |||
| $U = \{f \in V \mid f(m_0) = 0\} $ und | |||
| \\$W = \{f \in V \mid \forall x, y \in M \colon f(x) = f(y)\} $ | |||
| Zunächst: $K$ ist K-Vektorraum mit $(K, +, 0)$. Damit wird | |||
| $V = \text{Abb}(M, K)$ zum Vektorraum. | |||
| \begin{enumerate}[a)] | |||
| \item Beh.: $U \subset V$ ist Untervektorraum. | |||
| \begin{proof} | |||
| Seien $f_1, f_2 \in U$, $a \in K$ beliebig. Zu zeigen: | |||
| $(f_1 + f_2)(m_0) = 0 $ und $(a f_1)(m_0) = 0$. | |||
| \[ | |||
| (f_1 + f_2)(m_0) = f_1(m_0) + f_2(m_0) = 0 + 0 = 0 | |||
| .\] $\implies (f_1 + f_2) \in U$. | |||
| \[ | |||
| (a f_1)(m_0) = a f_1(m_0) = a \cdot 0 = 0 | |||
| .\] $\implies (a f_1) \in U$. | |||
| \end{proof} | |||
| Beh.: $W \subset V$ ist Untervektorraum | |||
| \begin{proof} | |||
| Seien $f_1, f_2 \in W$, $a \in K$ und $x, y \in M$ beliebig. | |||
| Zu zeigen: | |||
| $(f_1 + f_2)(x) = (f_1 + f_2)(y)$ | |||
| und $(a f_1)(x) = (a f_1)(y)$. | |||
| \begin{align*} | |||
| (f_1 + f_2)(x) = f_1(x) + f_2(x) = f_1(y) + f_2(y) | |||
| = (f_1 + f_2)(y) | |||
| .\end{align*} | |||
| $\implies (f_1 + f_2) \in W$. | |||
| \[ | |||
| (a f_1)(x) = a f_1(x) = a f_1(y) = (a f_1)(y) | |||
| .\] $\implies (a f_1) \in W$. | |||
| \end{proof} | |||
| \item Beh.: $U \cap W = \{0\} $ | |||
| \begin{proof} | |||
| Sei $f \in U \cap W$ beliebig: | |||
| \begin{align*} | |||
| &\forall m \in M \colon f(m) = f(m_0) \land f(m_0) = 0 \\ | |||
| \implies &\forall m \in M \colon f(m) = 0 \\ | |||
| \implies &f = 0 | |||
| .\end{align*} | |||
| \end{proof} | |||
| \item Beh.: $V = U + W$ | |||
| \begin{proof} | |||
| Sei $f \in V$ beliebig. | |||
| Zu zeigen: $\exists u \in U, \exists w \in W \colon f = u + w$ | |||
| Dann wähle $u \in U$, s.d. | |||
| \[ | |||
| u(m) = \begin{cases} | |||
| f(m) - f(m_0) & m \neq m_0 \\ | |||
| 0 & m = m_0 | |||
| \end{cases} | |||
| .\] und $w \in W$, s.d. | |||
| \[ | |||
| w(m) = f(m_0) \text{ } \forall m \in M | |||
| .\] | |||
| Damit folgt: | |||
| \[ | |||
| f(m) = u(m) + w(m) = \begin{cases} | |||
| f(m) - f(m_0) + f(m_0) = f(m) & m \neq m_0 \\ | |||
| 0 + f(m_0) = f(m_0) & m = m_0 | |||
| \end{cases} | |||
| .\] | |||
| \end{proof} | |||
| \end{enumerate} | |||
| \end{aufgabe} | |||
| \begin{aufgabe} | |||
| Es sei $K$ ein Körper, | |||
| $U = \text{Abb}\left( \{0, 1, \ldots, n\}, K\right) $ und | |||
| $V = \text{Abb}\left( \{0, 1, \ldots, n+1\}, K\right)$. | |||
| \begin{align*} | |||
| \psi\colon V &\to K^{n+2} \\ | |||
| f &\mapsto \left( f(0), f(1), \ldots, f((n+1) \right) \\ | |||
| \partial\colon V &\to U \\ | |||
| f &\mapsto \left( i \mapsto (i + 1) \cdot f(i+1) \right) | |||
| .\end{align*} | |||
| \begin{enumerate}[a)] | |||
| \item Beh.: $\psi$ ist linear. | |||
| \begin{proof} | |||
| Seien $v_1, v_2 \in V$, $a \in K$ beliebig. | |||
| \begin{align*} | |||
| \psi(v_1 + v_2) &= \left( (v_1+v_2)(0), (v_1 + v_2)(1), \ldots, (v_1+v_2)(n+1) \right) \\ | |||
| &= \left( v_1(0) + v_2(0), v_1(1) + v_2(1), \ldots, v_1(n+1) + v_2(n+1) \right) \\ | |||
| &= \left( v_1(0), v_1(1), \ldots, v_1(n+1) \right) | |||
| + \left( v_2(0), v_2(1), \ldots, v_2(n+1) \right) \\ | |||
| &= \psi(v_1) + \psi(v_2) | |||
| .\end{align*} | |||
| \begin{align*} | |||
| \psi(a v_1) &= \left(a v_1(0), a v_1(1), \ldots, a v_1(n+1)\right) \\ | |||
| &= a (v_1(0), v_1(1), \ldots, v_1(n+1) \\ | |||
| &= a \psi(v_1) | |||
| .\end{align*} | |||
| \end{proof} | |||
| Beh.: $\partial$ ist linear. | |||
| \begin{proof} | |||
| Seien $v_1, v_2 \in V$, $a \in K$ und $i \in \{0, 1, \ldots, n\} $ beliebig. | |||
| \begin{align*} | |||
| \partial(v_1+v_2)(i) &= (i+1) \cdot (v_1 + v_2)(i+1) \\ | |||
| &= (i+1) \cdot (v_1(i+1) + v_2(i+1)) \\ | |||
| &= (i+1)v_1(i+1) + (i+1)v_2(i+1) \\ | |||
| &= \partial(v_1)(i) + \partial(v_2)(i) | |||
| .\end{align*} | |||
| \begin{align*} | |||
| \partial(a v_1)(i) &= (i + 1)(a v_1)(i+1) \\ | |||
| &= a (i+1) v_1 (i+1) \\ | |||
| &= a \partial(v_1)(i) | |||
| .\end{align*} | |||
| \end{proof} | |||
| \item Beh.: $\psi$ ist Isomorphismus. | |||
| \begin{proof} | |||
| Zu zeigen: $\psi$ ist bijektiv. | |||
| Seien $v_1, v_2 \in V$ mit $\psi(v_1) = \psi(v_2)$. Dann | |||
| \begin{align*} | |||
| &\psi(v_1) = \left( f_1(0), f_1(1), \ldots, f_1(n+1) \right) | |||
| = \left( f_2(0), f_2(1), \ldots, f_2(n+1) \right) = \psi(v_2)\\ | |||
| \implies& f_1(k) = f_2(k) \text{ }\forall k \in \{0, \ldots, n+1\} \\ | |||
| \implies& f_1 = f_2 | |||
| .\end{align*} | |||
| $\implies \psi$ ist injektiv. | |||
| Sei $c = (c_0, \ldots, c_{n+1}) \in K^{n+2}$, dann ex. ein $f \in V$, s.d. | |||
| \begin{align*} | |||
| &f(k) = c_k \text{ } \forall k \in \{0, \ldots, n+1\} \\ | |||
| \implies &\psi(f) = c | |||
| .\end{align*} | |||
| $\implies \psi$ ist surjektiv. | |||
| \end{proof} | |||
| \item Beh.: $\partial$ surjektiv | |||
| $\iff \text{char}K \notin \{2, \ldots, n+1\} $ | |||
| \begin{proof} | |||
| Damit $\partial$ surjektiv ist, muss für alle $u \in U$ | |||
| ein $v \in V$ existieren, s.d. $\partial(v) = u$. | |||
| Sei $u \in U, k \in \{0, \ldots, n\}$ beliebig, dann muss | |||
| für $v$ gelten: | |||
| \begin{align*} | |||
| &\partial(v)(k) = (k + 1) \cdot v(k+1) = u(k) | |||
| .\end{align*} | |||
| Dies ist genau dann wohldefiniert, wenn $k+1 \neq 0$, denn genau | |||
| dann ex. ein Inverses zu $k+1$ und damit: | |||
| \begin{align*} | |||
| &v(k+1) = (k+1)^{-1} \cdot u(k) | |||
| .\end{align*} | |||
| Bleibt zu zeigen: char$K \not\in \{2, \ldots, n+1\} \iff | |||
| k+1 \neq 0$ $\forall k \in \{0, \ldots, n\} $. | |||
| \begin{align*} | |||
| &k + 1 \neq 0 \\ | |||
| \stackrel{k > 0}{\iff} & k + 1 \neq \text{char}K \\ | |||
| \stackrel{0 \le k \le n}\iff & \text{char}K = 0 \lor \text{char}K > n + 1 \\ | |||
| \iff & \text{char}K \not\in \{2, \ldots, n+1\} | |||
| .\end{align*} | |||
| \end{proof} | |||
| \item Beh.: $\psi(\text{ker }\partial) = | |||
| \left\{ (c, \underbrace{0, \ldots, 0}_{n+1\text{-mal}}) \mid c \in K\right\} $ | |||
| \begin{proof} | |||
| Zunächst: $\text{ker }\partial$. | |||
| Damit $r \in V$ im Kern von $\partial$ liegt, muss gelten: | |||
| $\partial(r)(k) = 0$ $\forall k \in \{0, \ldots, n\}$ | |||
| \begin{align*} | |||
| &\partial(r)(k) = (k+1) \cdot r(k+1) \\ | |||
| \stackrel{k+1 \neq 0}{\implies} &r(k+1) = 0 | |||
| .\end{align*} | |||
| Damit: $r(k) = 0$ $\forall k \in \{1, \ldots, n+1\} $. | |||
| \begin{align*} | |||
| \psi(r) &= \left( r(0), r(1), \ldots, r(n+1) \right) \\ | |||
| &= (c, \underbrace{0, \ldots, 0}_{n+1\text{-mal}}) \text{ } \forall c \in K | |||
| .\end{align*} | |||
| Das heißt: | |||
| \[ | |||
| \psi(\text{ker }\partial) = \left\{ (c, \underbrace{0, \ldots, 0}_{n+1\text{-mal}}) \mid c \in K\right\} | |||
| .\] | |||
| \end{proof} | |||
| \end{enumerate} | |||
| \end{aufgabe} | |||
| \end{document} | |||