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{{{#!Gallery2 columns=3,mode=2 * [100_1183.JPG Hannover] * [100_1184.JPG Berlin] }}} |
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standard formula: If f is entire (holomorphic on latex2(\usepackage{dsfont} % $$\mathds{C}$$)) and without zeroes, for every closed curve latex2($$\gamma$$) the integral latex2($$\oint_\gamma \frac{f'(z)}{f(z)}dz$$) is zero.
This is a red square:
\usepackage{graphics,color} %%end-prologue%% \newsavebox{\mysquare} \savebox{\mysquare}{\textcolor{red}{\rule{1in}{1in} } } \usebox{\mysquare}
This is a Z notation:
\usepackage{oz} \setlength{\zedcornerheight}{0.2em} %%end-prologue%% \small \begin{schema}{level2\_robot} \textbf{in~} x: \mathbb{B} \\ \textbf{in~} feeling: \mathbb{R} \\ \textbf{in~} control: \mathbb{C} \\ \zbreak \textbf{out~} moving: \mathbb{R} \\ \textbf{out~} u: \mathbb{B} \\ \ST \zbreak control.1.1 = x2moving \imp \\ \t1 maxrate(x, $10K$) \\ \t1 \land delay(pr''(x \copyright DBH), moving, \Delta_{level2\_robot}) \\ \zbreak control.1.1 = feeling2u \imp \\ \t1 maxrate(u, $10K$) \\ \t1 \land delay(feeling, pr''(u \copyright IBH), \Delta_{level2\_robot}) \\ \zbreak control.1.1 = x2moving\_feeling2u \imp \\ \t1 maxrate(x, $10K$) \\ \t1 \land maxrate(u, $10K$) \\ \t1 \land delay(pr''(x \copyright DBH), moving, \Delta_{level2\_robot}) \\ \t1 \land delay(feeling, pr''(u \copyright IBH), \Delta_{level2\_robot}) \\ \end{schema}