August 29, 2017 - 4:15pm to 5:15pm

## Roever Mini-Symposium: "Convex Cones, Integral Zonotopes, and Their Limit Shape"

Imre Barany, Hungarian Academy of Sciences and University College London

Cupples I, room 199

*Abstract: Given a convex cone $C$ in $R^d$, an integral zonotope $T$ is the sum of segments $[0,v_i]$ ($i=1,\ldots,m$) where each $v_i \in C$ is a vector with integer coordinates. The endpoint of $T$ is $k=\sum_1^m v_i$.*