Upcoming Talks

We show that any cocompact Kleinian group $\Gamma$ has an exhaustive filtration by normal subgroups $\Gamma_i$ such that any subgroup of $\Gamma_i$ generated by $k_i$ elements is free, where $k_i \ge [\Gamma:\Gamma_i]^C$ and $C = C(\Gamma) > 0$. Together with this result we prove that $\log k_i \ge C_1 \mathrm{sys}_1(M_i)$, where $\mathrm{sys}_1(M_i)$ denotes the systole of $M_i$, thus providing a large set of new examples for a conjecture of Gromov. In the second theorem $C_1> 0$ is an absolute constant.

The first part of this lecture series is meant to illustrate the dictum that all suÿciently beautiful mathematical objects are connected. The two objects we choose to illustrate this are the icosahedron, the most subtle of the Platonic solids, and the Rogers-Ramanujan identities, often considered the most beautiful formulas in all of mathematics.

A multiple zeta value (MZV) is a real number specified by a string of positive integers.
The sum of the string is the weight, and its length is the depth.  MZVs of depth one are
just values of the Riemann zeta function at positive integers; MZVs of depth two were
already studied by Euler.  MZVs of arbitrary depth became a hot topic in the early 1990s
with their simultaneous appearance in perturbative quantum field theory and knot
theory.  Since then the field has continued to develop rapidly.  I will describe various

In this talk, I'll discuss recent joint work with Vera Vertesi to develop a new version of an open book decomposition for contact three-manifolds.  Our foliated open books join a zoo of existing types of open books, so I'll focus on the senses in which ours is a natural construction which provides a user-friendly approach to cutting and gluing.