$\vec{w}h\alpha\mathfrak{t}\;\; i\mathbb{S}\ldots$

a positional game?

Dennis Clemens (FU)
2013/02/19, 10:00
Before the BMS Days Colloquium by Prof. Tibor Szabó
Urania Berlin, at the BMS Loft (3rd floor)
About what?

Using some specific examples, we will introduce positional games, in particular, the class of maker-breaker games. Moreover, we will take a deeper look at the Erdős-Selfridge theorem from 1973 which often is seen as the starting point in the history of maker-breaker games.