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| − | <div style="margin: auto; float: right; margin-left: 5px!important;">{{#widget:Twitter
| + | #REDIRECT [[Sandbox]] |
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| − | * [[File:Remake-poster.jpg|frameless|border]] [[Remake|REMAKE: REthinking Media Art in K(C)ollaborative Environments]] [http://www.dum-umeni.cz/en/vystava/remake exhibition] opened in [[Brno]], Czech Republic. Remake is an international art project taking place between June 2010 and May 2012. Its aim is to foster creation and presentation of contemporary works inspired by the history of media arts. The project’s final part is an international touring exhibition which is currently shown at The Brno House of Arts. The project builds upon a long-running collaborative research of media art histories, [[Monoskop]]. Remake was started by several cultural organisations coordinated by [[Atrakt Art]] with an intention to create and present the contemporary art works inspired by the history of media arts in the East-Central Europe. (6 March 2012)
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| − | <wikitex refresh dpi="144">
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| − | <nowiki>
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| − | \section*{Education}
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| − | \begin{itemize}
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| − | \item M.A. Media Design and Communication: Networked Media, Piet Zwart Institute, Willem de Kooning Academy, Rotterdam University, Netherlands, 2010--2012.
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| − | \item M.A. Information Technologies, Faculty of Economic Informatics, Economic University of Bratislava, Slovakia, 1997--2002.
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| − | \begin{itemize}
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| − | \item \textit{Dissertation:} Electronic Business (Online Market in the Mirror of Chaos Theory).
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| − | \end{itemize}
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| − | \item Mass Media Communication, Faculty of Mass Media Communication, University of Cyril and Method in Trnava, Slovakia, 1999--2001.
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| − | \end{itemize}
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| − | </nowiki>
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| − | </wikitex>
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| − | <wikitex>
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| − | Let $Q$ be any finite set, and $\mathcal B=2^Q$ be the collection of the subsets of
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| − | $Q$. Let $f:\mathcal B\rightarrow \mathbb R$ be a function assigning real numbers to
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| − | the subsets of $Q$ and suppose $f$ satisfies the following conditions:
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| − | :(i) $f(A)\ge 0$ for all $A\subseteq Q$, $f(\emptyset)=0$,
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| − | :(ii) $f$ is monotone, i.e. if $A\subseteq B\subseteq Q$ then $f(A)\le f(B)$,
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| − | :(iii) $f$ is submodular, i.e. if $A$ and $B$ are different subsets of $Q$ then
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| − | $$f(A)+f(B)\ge f(A\cap B) + f(A\cup B).\eqno{(2)}$$
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| − | </wikitex>
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| − | Property test: [[testproperty::Dummypage]]
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| − | {{#widget:YouTube|id=t2PsiJXswiM}}
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| − | <wikitex>
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| − | <math>\frac{1}{\displaystyle1+\frac{1}{\displaystyle 1+\sqrt{5}}}</math>
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| − | </wikitex>
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