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

the dimension of a partial order?

Felix Schröder (TU Berlin)
2020/02/18, 10:00
Before the BMS Days' talk by Prof. Stefan Felsner
Urania Berlin, at the BMS Loft (2nd floor)
About what?

Partial orders are among the most basic combinatorial structures, related to foundational mathematics such as properties of set systems as well as applied mathematics such as scheduling. We will look at multiple ways to visualize these posets, yielding a combinatorial definition of their dimension. We will then investigate the dimension of some special posets.