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Welcome to Monoskop, the media art and culture wiki.
Latest news
- Monoskop moves to a new domain: http://monoskop.org. Old links are preserved. (5 Mar 2012)
- New categories: 3D printing, Circuit bending (10 December 2011)
- New categories: Internet activism, Data activism, Copyright activism, FLOSS, Filesharing (4 December 2011)
- Monoskop wiki now supports embedding videos from Youtube, Vimeo, Blip.tv, Google Video, UStream, and basically any publicly accessible website (using HTML5 video tag), as well as documents from Google Books, Scribd, and SlideShare, image searches and slideshows from Flickr, and stills from Google Maps and Google Street View. See MediaWikiWidgets manual to learn how. (16 November 2011)
- Entry about Electromagnetism (May 2011)
- Entry about SuperCollider (September 2010)
- Entry about Film labs (June 2010)
- Entry about Hauntology (May 2010)
- Entry about Surf clubs (April 2010)
- Currently working on the book: Collaborative research on media art and culture in Central and Eastern Europe (2009)
- Realising there are almost 100 users or so registered, we did small improvements in user profiles. Using your profile (find here) you can now share what you have been working on, message others, etc. (28 July 2008)
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\section*{Education}
\begin{itemize}
\item M.A. Media Design and Communication: Networked Media, Piet Zwart Institute, Willem de Kooning Academy, Rotterdam University, Netherlands, 2010--2012.
\item M.A. Information Technologies, Faculty of Economic Informatics, Economic University of Bratislava, Slovakia, 1997--2002.
\begin{itemize}
\item \textit{Dissertation:} Electronic Business (Online Market in the Mirror of Chaos Theory).
\end{itemize}
\item Mass Media Communication, Faculty of Mass Media Communication, University of Cyril and Method in Trnava, Slovakia, 1999--2001.
\end{itemize}
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<wikitex> Let $Q$ be any finite set, and $\mathcal B=2^Q$ be the collection of the subsets of $Q$. Let $f:\mathcal B\rightarrow \mathbb R$ be a function assigning real numbers to the subsets of $Q$ and suppose $f$ satisfies the following conditions:
- (i) $f(A)\ge 0$ for all $A\subseteq Q$, $f(\emptyset)=0$,
- (ii) $f$ is monotone, i.e. if $A\subseteq B\subseteq Q$ then $f(A)\le f(B)$,
- (iii) $f$ is submodular, i.e. if $A$ and $B$ are different subsets of $Q$ then
$$f(A)+f(B)\ge f(A\cap B) + f(A\cup B).\eqno{(2)}$$
</wikitex>
Property test: Dummypage
<wikitex> <math>\frac{1}{\displaystyle1+\frac{1}{\displaystyle 1+\sqrt{5}}}</math> </wikitex>