|January 20||Organizational Meeting||Room 520, 2pm|
|February 3||Victoria Akin, Chicago||Point-pushing in the mapping class group|
|February 9, 2:40pm
|Dani Wise||A graph coloring problem and its algebraic and topological consequences|
|February 10 POSTPONED, SNOW||Jonah Gaster, Boston College||Combinatorial properties of curve graphs|
|February 17||Sarah Mousley, U. Illinois||Boundary maps for some hierarchically hyperbolic spaces|
|February 24||Carolyn Abbott, CUNY and Wisconsin||Universal acylindrical actions|
|March 3||Feng Luo, Rutgers||TBA|
|March 10||Anh Tran, UT Dallas||The topology of the Jones polynomial|
|March 17||No seminar||Spring break|
|March 24||Xinghua Gao, Illinois||TBA|
|March 31||Ilya Kofman, CUNY||TBA|
|April 7||Matthew Stover||TBA|
|April 28||Kevin Kordek, TAMU||TBA|
Victoria Akin, Chicago
Title: Point-pushing in the mapping class group
The point-pushing subgroup of the mapping class group of a surface with a marked point can be considered topologically as the subgroup that pushes the marked point about loops in the surface. Birman, who discovered the point-pushing map, showed that this subgroup is abstractly isomorphic to the fundamental group of the surface, \pi_1(S). We can characterize this point-pushing subgroup algebraically as the only normal subgroup inside of the mapping class group isomorphic to \pi_1(S). This uniqueness allows us to recover a description of the outer automorphism group of the mapping class group.
Dani Wise, Room 507
February 9, 2:40pm
Title: A graph coloring problem and its algebraic and topological consequences.
I will first describe a simple graph coloring problem and survey some examples of graphs for which the coloring problem has or has no solution. I will then give a quick introduction to Bestvina-Brady Morse theory. Finally, I will describe the relationship between the coloring problem and some amusing virtual algebraic fibering consequences for geometric group theory and hyperbolic 4-manifolds. This is joint work with Kasia Jankiewicz and Sergey Norin.
Jonah Gaster, Boston College
Title: Combinatorial properties of curve graphs
The curve graph of a closed oriented surface of genus $g$ has vertices given by simple closed curves, and edges that correspond to curves that can be realized disjointly. Inquiry into the large scale geometry of these graphs has borne considerable fruit, and lead to the resolution of some of Thurston's conjectures. We will take a more naive perspective and explore instead combinatorial properties of this graph. For instance, what is its chromatic number (finite due to work of Bestvina-Bromberg-Fujiwara)? What are its induced subgraphs? Though precise answers to these questions are currently beyond reach, we will present progress that informs them. In particular, in joint work with Josh Greene and Nick Vlamis we show that the separating curve graph has chromatic number coarsely equal to $g \log(g)$, and the subgraph spanned by vertices in a fixed non-zero homology class is uniquely $g-1$-colorable.
Sarah Mousley, U. Illinois
Title: Boundary maps for some hierarchically hyperbolic spaces
There are natural embeddings of right-angled Artin groups $G$ into the mapping class group $Mod(S)$ of a surface $S$. The groups $G$ and $Mod(S)$ can each be equipped with a geometric structure called a hierarchically hyperbolic space (HHS) structure, and there is a notion of a boundary for such spaces. In this talk, we will answer the following question: does every embedding $\phi: G \rightarrow Mod(S)$ extend continuously to a boundary map $\partial G \rightarrow \partial Mod(S)$? That is, given two sequences $(g_n)$ and $(h_n)$ in $G$ that limit to the same point in $\partial G$, do $(\phi(g_n))$ and $(\phi(h_n))$ limit to the same point in $\partial Mod(S)$? No background in HHS structures is needed.
Carolyn Abbott, CUNY and Wisconsin
Title:Universal acylindrical actions
The class of acylindrically hyperbolic groups, which are groups that admit a certain type of non-elementary action on a hyperbolic space, contains many interesting groups such as non-exceptional mapping class groups and Out(F_n) for n>1. In such a group, a generalized loxodromic element is one that is loxodromic for some acylindrical action of the group on a hyperbolic space. Given a finitely generated group, one can look for an acylindrical action on a hyperbolic space in which all generalized loxodromic elements act loxodromically; such an action is called a universal acylindrical action. I will discuss recent results in the search for universal acylindrical actions, describing a class of groups for which it is always possible to construct such an action as well as an example of a group for which no such action exists.
Feng Luo, Rutgers
Anh Tran, UT Dallas
Title: The topology of the Jones polynomial
We will discuss old and new conjectures about the topology of the Jones polynomial.
These include the AJ conjecture, slope conjecture, and strong slope conjecture.
The AJ conjecture of Garoufalidis relates the A-polynomial and the colored Jones polynomial of a knot. The A-polynomial was introduced by Cooper et al. in 1994 and has been fundamental in geometric topology. A similar conjecture to the AJ conjecture was also proposed by Gukov from the viewpoint of the Chern-Simons theory. The slope conjecture of Garoufalidis and a new conjecture of Kalfagianni and the speaker are about the relationship between the degree of the colored Jones polynomial of a knot and the topology of the knot.
These conjectures assert that certain boundary slopes and Euler characteristics of essential surfaces in a knot complement can be read off from the degree of the colored Jones polynomial.
Xinghua Gao, Illinois
Ilya Kofman, CUNY
Matthew Stover, Temple
Kevin Kordek, TAMU
Other relevant information.Fall 2016, Spring 2016, Fall 2015, Spring 2015, Fall 2014, Spring 2014, Fall 2013, Spring 2013, Fall 2012, Spring 2012, Fall 2011, 2010/11, Spring 2010, Fall 2009, Spring 2009, Fall 2008, Spring 2008, Fall 2007, Spring 2007, Fall 2006.
- Columbia Symplectic Geometry/Gauge Theory Seminar
- All Columbia Math Dept Seminars
- CUNY Geometry and Topology Seminar
- CUNY Complex Analysis & Dynamics Seminar
- CUNY Magnus Seminar
- Princeton Topology Seminar.