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

the conformal geometry of surfaces?

Wayne Lam (TU Berlin)
2013/11/15, 13:00
Before the BMS Friday Colloquium by Prof. Boris Springborn
Urania Berlin, at the BMS Loft (3rd floor)
About what?

A brief introduction to conformal geometry and its relation to complex analysis is shown. Some basic results, like the Riemann mapping theorem, are emphasized for their relations to the discrete theory. The goal is to give the audience a taste of discrete differential geometry.