UBC Discrete Math Seminar: Federico Ardila

There are numerous contexts where a discrete system moves according to local, reversible moves. The configuration space, which contains all possible states of the system, is often a CAT(0) cube complex. When this is the case, we can use techniques from geometric group theory and poset theory to understand, measure, and navigate these spaces. I will present a self-contained introduction to these ideas, and discuss some applications to robotic motion planning, phylogenetics, probability, and enumerative combinatorics.

The talk will assume no previous knowledge of CAT(0) cube complexes. It will include joint work with many people, including Tia Baker, Naya Banerjee, Hanner Bastidas, César Ceballos, John Guo, Megan Owen, Seth Sullivant, Coleson Weir, and Rika Yatchak.