% % spielb.tex -- slide template % % (c) 2021 Prof Dr Andreas Müller, OST Ostschweizer Fachhochschule % \bgroup \begin{frame}[t] \setlength{\abovedisplayskip}{5pt} \setlength{\belowdisplayskip}{5pt} \frametitle{Modifiziertes Spiel $\tilde{B}$} \vspace{-20pt} \begin{columns}[t,onlytextwidth] \begin{column}{0.48\textwidth} \begin{block}{Definition} Gewinn $\pm 1$, Wahrscheinlichkeit abhängig vom 3er-Rest des aktuellen Kapitals $K$: \begin{center} \begin{tikzpicture}[>=latex,thick] \coordinate (A0) at (90:2); \coordinate (A1) at (210:2); \coordinate (A2) at (330:2); \node at (A0) {$0$}; \node at (A1) {$1$}; \node at (A2) {$2$}; \draw (A0) circle[radius=0.4]; \draw (A1) circle[radius=0.4]; \draw (A2) circle[radius=0.4]; \draw[->,shorten >= 0.4cm,shorten <= 0.4cm] (A0) -- (A1); \draw[->,shorten >= 0.4cm,shorten <= 0.4cm] (A0) -- (A2); \draw[->,shorten >= 0.4cm,shorten <= 0.4cm] (A1) -- (A2); \draw[->,shorten >= 0.4cm,shorten <= 0.4cm] (A1) to[out=90,in=-150] (A0); \draw[->,shorten >= 0.4cm,shorten <= 0.4cm] (A2) to[out=90,in=-30] (A0); \draw[->,shorten >= 0.4cm,shorten <= 0.4cm] (A2) to[out=-150,in=-30] (A1); \def\R{1.9} \def\r{0.7} \node at (30:{0.9*\r}) {\tiny $\frac{9}{10}\uncover<2->{+\varepsilon}$}; \node at (150:{0.9*\r}) {\tiny $\frac1{10}\uncover<2->{-\varepsilon}$}; \node at (270:\r) {$\frac34\uncover<2->{-\varepsilon}$}; \node at (30:{1.1*\R}) {$\frac{3}{4}\uncover<2->{-\varepsilon}$}; \node at (150:{1.1*\R}) {$\frac1{4}\uncover<2->{+\varepsilon}$}; \node at (270:\R) {$\frac14\uncover<2->{+\varepsilon}$}; \end{tikzpicture} \end{center} \end{block} \end{column} \begin{column}{0.48\textwidth} \begin{block}{Markov-Kette $\tilde{Y}$} Übergangsmatrix \[ \tilde{B}= B\uncover<2->{+\varepsilon F} \uncover<3->{= B+\varepsilon\begin{pmatrix*}[r] 0&1&-1\\ -1&0&1\\ 1&-1&0 \end{pmatrix*}} \] \vspace{-12pt} \uncover<4->{% Gewinnmatrix: \[ G=\begin{pmatrix*}[r] 0&-1&1\\ 1&0&-1\\ -1&1&0 \end{pmatrix*} \]} \end{block} \vspace{-12pt} \uncover<5->{% \begin{block}{Gewinnerwartung} \begin{align*} \uncover<6->{E(\tilde{Y}) &= U^t(G\odot \tilde{B})p} \\ &\uncover<7->{= E(Y) + \varepsilon U^t(G\odot F)p} \uncover<8->{= {\textstyle\frac1{15}}+2\varepsilon} \\ \uncover<9->{ \text{rep.} &= -{\textstyle\frac{294}{169}}\varepsilon+O(\varepsilon^2) \quad\text{Verlustspiel} } \end{align*} \end{block}} \end{column} \end{columns} \end{frame} \egroup