add graphics

vor 5 Jahren · df5ec7ac25
--- a/ana16.tex
+++ b/ana16.tex
@@ -82,9 +82,51 @@ Notationen: $x' = f(t,x), \dot x = f(t,x), \dv{x}{t} = f(t,x)$ (Dynamischer Proz
        \end{align*}
    \end{enumerate}
 \end{bsp}
 %\begin{figure}[h]
 %    \caption{Veranschaulichung: Richtungsfeld
 %\end{figure}

 \begin{figure}[h]
    \centering
    \begin{tikzpicture}[declare function={f(\x) = 2*(\x-0.25);}]
        \begin{axis}%
            [%minor tick num=4,
             %grid style={line width=.1pt, draw=gray!10},
             %major grid style={line width=.2pt,draw=gray!50},
             %axis lines=middle,
             %enlargelimits={abs=0.2},
             %ymax=5,
             %ymin=0
             width=0.6\textwidth, % Overall width of the plot
             axis equal image, % Unit vectors for both axes have the same length
             view={0}{90}, % We need to use "3D" plots, but we set the view so we look at them from straight up
             xmin=0, xmax=1.1, % Axis limits
             ymin=0, ymax=1.1,
             domain=0:1, y domain=0:1, % Domain over which to evaluate the functions
             xtick={0.7}, ytick={0.3525}, % Tick marks
             xticklabels={$t_0$},
             yticklabels={$y_0$},
             xlabel=$t$,
             ylabel=$y$,
             samples=11, % How many arrows?
             cycle list={    % Plot styles
                     gray,
                     quiver={
                         u={1}, v={f(x)}, % End points of the arrows
                         scale arrows=0.075,
                         every arrow/.append style={
                             -latex % Arrow tip
                         },
                     }\\
                     red, samples=31, smooth, thick, no markers, domain=0:1.1\\ % The plot style for the function
                }
            ]
            \addplot3 (x,y,0);
            \addlegendentry{$f'(t,x)$}
            \addplot{(x-0.25)^2+0.15};
            \addlegendentry{$y(t)$}
          \end{axis}
    \end{tikzpicture}
    \caption{Veranschaulichung: Richtungsfeld für DGL der Form $y' = f(x)$}
 \end{figure}

 \begin{definition}[System erster Ordnung]
    Sei $D = I\times \Omega \subset \R\times \R^n,\ f\colon D\to \R^n$ stetig. Dann heißt 
    \begin{equation}
@@ -141,6 +183,30 @@ Eine Lösung von \eqref{DGLOrd1} ist eine differenzierbare Funktion $y:I\to \R^n
    \]
    Dann existiert eine Lösung $y(t)$ von AWA auf dem Intervall $I \coloneqq [t_0-T,t_0+T]$ mit \[T \coloneqq \min_{y(t)}\left\{\alpha,\frac{\beta}{M}\right\},\; M\coloneqq \max_{(t,x)\in D}\norm{f(t,x)}\]
 \end{satz}
 %\begin{figure}[h]
 %    \begin{tikzpicture}
 %        \begin{axis}%
 %            [grid=none,
 %             minor tick num=4,
 %             grid style={line width=.1pt, draw=gray!10},
 %             major grid style={line width=.2pt,draw=gray!50},
 %             axis lines=middle,
 %             %enlargelimits={abs=0.2},
 %             ymax=5, ymin=-1.5,
 %             xmin=2, xmax=7,
 %             xtick={5}, ytick={2},
 %             xticklabels={$t_0$},
 %             yticklabels={$y_0$},
 %             xlabel=$t$,
 %             ylabel=$x$,
 %            ]
 %            \draw (4,1) rectangle (6,3);
 %            \node at (5.8,1.3) {$D$};
 %            \addplot[domain=1:10,samples=50,smooth,red] {2^(x-3)-2};
 %            \addlegendentry{$y(t)$}
 %          \end{axis}
 %    \end{tikzpicture}
 %\end{figure}
 Reminder:
 \begin{enumerate}
    \item Gleichmäßige Stetigkeit: \[f\colon D\to \R,\; D\subset \R^n\] ist gleichmäßig stetig in $D$, falls $\forall \epsilon > 0,\;\exists \delta > 0$, sodass $\forall x,x_0\in D$ gilt \[\norm{x-x_0}< \delta \implies \norm{f(x)-f(x_0)}< \epsilon\]
@@ -168,6 +234,48 @@ Reminder:
    \end{itemize}
    Definiere die stückweise lineare Funktion $y^h(t)$
    \[y^h(t)\coloneqq y_{n-1}^h + (t-t_{n-1})f(t_{n-1},y_{n-1}^h),\quad t\in [t_{n-1},t_n],\quad \forall n\ge 1\]
    \begin{figure}[h]
        \centering
        \begin{tikzpicture}[declare function={f1(\x) = 0.5*(2)^(\x-1) + 10/(\x+2);
            f2(\x) = 0.5*(2)^(\x-1);
            f3(\x) = 0.5*(2)^(\x-1) - 10/(\x+2);
            f4(\x) = 0.5*(2)^(\x-1) - 20/(\x+2);}]
            \begin{axis}%
                [grid=none,
                 %minor tick num=4,
                 grid style={line width=.1pt, draw=gray!10},
                 major grid style={line width=.2pt,draw=gray!50},
                 axis lines=middle,
                 %enlargelimits={abs=0.2},
                 ymax=10, ymin=-1.5,
                 xmin=-1, xmax=7,
                 xtick={2,3,4,5},
                 ytick=\empty,
                 xticklabels={$t_0$, $t_1$, $t_2$, $t_3$},
                 %yticklabels={$y_0$, $y_1^{h}$, $y_2^{h}$},
                 xlabel=$t$,
                 ylabel=$x$,
                ]
                \addplot[domain=0:10,samples=50,smooth,green] {f1(x)};
                \addlegendentry{$y(t,t_0,y_0)$};
                \addplot[domain=0:10,samples=50,smooth,blue] {f2(x)};
                \addlegendentry{$y(t, t_1, y_1^{h})$};
                \addplot[domain=0:10,samples=50,smooth,orange] {f3(x)};
                \addlegendentry{$y(t, t_2, y_2^{h})$};
                \addplot[domain=0:10,samples=50,smooth,pink] {f4(x)};
                \addlegendentry{$y(t, t_3, y_3^{h})$};
                \draw (2,{f1(2)}) node[circle,fill,inner sep=0.5pt] {}
                    -- (3,{f2(3)}) node[circle,fill,inner sep=0.5pt] {}
                    -- (4, {f3(4)}) node[circle,fill,inner sep=0.5pt] {}
                    -- (5, {f4(5)}) node[circle,fill,inner sep=0.5pt] {};
                \draw[dashed,green] (2, {f1(2)}) -- (0, {f1(2)}) node[label=left:$y_0$](){};
                \draw[dashed,blue] (3, {f2(3)}) -- (0, {f2(3)}) node[label=left:$y_1$](){};
                \draw[dashed,orange] (4, {f3(4)}) -- (0, {f3(4)}) node[label=left:$y_2$](){};
                \draw[dashed,pink] (5, {f4(5)}) -- (0, {f4(5)}) node[label=left:$y_3$](){};
              \end{axis}
        \end{tikzpicture}
        \caption{Eulersches Polygonzugverfahren}
    \end{figure}
    \begin{enumerate}[1)]
        \item \textbf{z.Z.} dass dieses Verfahren durchführbar ist, d.h. $\graph(y^h)\subset D$. Sei $(t,y^h(t))\subset D$ für $t_0 \le t\le t_{k-1}$. Dann gilt 
        \[
@@ -187,7 +295,52 @@ Reminder:
        \end{align*}
        Also ist $(t,y^h(t))\in D$ für $t_{k-1} \le t\le t_k$. Mit Annahme folgt $(t,y^h(t))\in D$ für $t_0\le t\le t_k \implies \graph(y^h)\subset D$.
        \item \begin{enumerate}[(a)]
            \item \textbf{z.Z.} dass die Funktionenfamilie $\{y^h\}_{h>0}$ gleichgradig stetig ist. Seien dafür $t,t'\in I, \ t'\le t$ beliebig mit $t\in [t_{k-1},t_k],\; t'\in [t_{j-1},t_j]$ für ein $t_j\le t_k$.\begin{itemize}
            \item \textbf{z.Z.} dass die Funktionenfamilie $\{y^h\}_{h>0}$ gleichgradig stetig ist. Seien dafür $t,t'\in I, \ t'\le t$ beliebig mit $t\in [t_{k-1},t_k],\; t'\in [t_{j-1},t_j]$ für ein $t_j\le t_k$.
                \begin{figure}[h]
                    \centering
                    \begin{tikzpicture}[declare function={f1(\x) = 0.5*(2)^(\x-1) + 10/(\x+2);
                        f2(\x) = 0.5*(2)^(\x-1);
                        f3(\x) = 0.5*(2)^(\x-1) - 10/(\x+2);
                        f4(\x) = 0.5*(2)^(\x-1) - 20/(\x+2);}]
                        \begin{axis}%
                            [grid=none,
                             %minor tick num=4,
                             grid style={line width=.1pt, draw=gray!10},
                             major grid style={line width=.2pt,draw=gray!50},
                             axis lines=middle,
                             %enlargelimits={abs=0.2},
                             ymax=10, ymin=-1.5,
                             xmin=1, xmax=6,
                             xtick={2,3,4,5},
                             ytick={1},
                             xticklabels={$t_0$, $t_1$, $t_2$, $t_3$},
                             yticklabels={$y_0$},
                             xlabel=$t$,
                             ylabel=$x$,
                            ]
                            \addplot[domain=0:10,samples=50,smooth] {f2(x)};
                            \draw (2,{f2(2)}) node[circle,fill,inner sep=0.5pt] {}
                                (3,{f2(3)}) node[circle,fill,inner sep=0.5pt] {}
                                (4,{f2(4)}) node[circle,fill,inner sep=0.5pt] {}
                                (5,{f2(5)}) node[circle,fill,inner sep=0.5pt] {};
                            \draw[dashed,red] (2.4, {f2(2.4)}) -- (2.4, 0)
                                node [label={[label distance=-0.8mm]below:$t$}](){};
                            \draw[dashed,red] (4.7, {f2(4.7)}) -- (4.7, 0)
                                node [label={[label distance=-0.8mm]below:$t'$}](){};
                            \draw[dashed,blue] (3.2, {f2(3.2)}) -- (3.2, 0)
                                node [label={[label distance=-1mm]below:$t$}](){};
                            \draw[dashed,blue] (3.8, {f2(3.8)}) -- (3.8, 0)
                                node [label={[label distance=-1mm]below:$t'$}](){};
                            \draw[dashed,black] (2, {f2(2)}) -- (0, {f2(2)})
                                node [label={[label distance=-1mm]below:$t$}](){};
                            %\draw[dashed,blue] (3, {f2(3)}) -- (0, {f2(3)}) node[label=left:$y_1$](){};
                            %\draw[dashed,orange] (4, {f3(4)}) -- (0, {f3(4)}) node[label=left:$y_2$](){};
                            %\draw[dashed,pink] (5, {f4(5)}) -- (0, {f4(5)}) node[label=left:$y_3$](){};
                          \end{axis}
                    \end{tikzpicture}
                    \caption{Blau: erster Fall, Rot: zweiter Fall}
                \end{figure}
            \begin{itemize}
                \item $t,t' \in [t_{k-1},t_k]$:
                \begin{align*}
                    y^h(t)-y^h(t')&= y_{k-1}^h + (t-t_{k-1})f(t_{k-1},y_{k-1}^h)\\
@@ -228,4 +381,4 @@ Reminder:
        \item \textbf{z.Z.} $y(t)$ erfüllt die Differentialgleichung $y'(t) = f(t,y(t))$ oder äquivalent dazu: $y(t)$ erfüllt die Integralgleichung \[y(t) = y_0 + \int_{t_0}^{t} f(s,y(s))\d s\]
    \end{enumerate}
 \end{proof}
 \end{document}
 \end{document}
--- a/analysisII.pdf
+++ b/analysisII.pdf