Organizers: Kyle Hayden, Siddhi Krishna
The GT seminar typically meets on Fridays at 2:00pm Eastern time via the Zoom link above. (The password is `math').

Other area seminars. Our e-mail list. Archive of previous semesters

Fall 2021

Date	Time (Eastern)	Speaker	Title
September 17	11 am (Note nonstandard time)	Wenyuan Yang	Proper actions of 3-manifold groups on finite product of quasi-trees
September 24	2 pm	Isaac Sundberg	The Khovanov homology of slice disks
October 1	2 pm	Gage Martin
October 8	2 pm	Joshua Howie
October 15	2 pm	Marissa Loving
October 22	2 pm	Jonathan Zung
October 29
November 5
November 12		Valeriano Aiello
November 19	2 pm	Cameron Rudd
December 3
December 10

Abstracts

Wenyuan Yang, Peking University

September 17, 2021

Title: Proper actions of 3-manifold groups on finite product of quasi-trees

Abstract: Let M be a compact, connected, orientable 3-manifold. In this talk, I will study when the fundamental group of M acts properly on a finite product of quasi-trees. Our main result is that this is so exactly when M does not contain Sol and Nil geometries. In addition, if there is no $\widetilde{SL(2, \mathbb{R})}$ geometry either, then the orbital map is a quasi-isometric embedding of $\pi_1(M)$. This is called property (QT) by Bestvina-Bromberg-Fujiwara, who established it for residually finite hyperbolic groups and mapping class groups. The main step of our proof is to show property (QT) for the classes of Croke-Kleiner admissible groups and of relatively hyperbolic groups under natural assumptions. Accordingly, this yields that graph 3-manifold and mixed 3-manifold groups have property (QT). This represents joint work with N.T. Nguyen and S.Z. Han.

Isaac Sundberg, Bryn Mawr College

September 24, 2021

Title: The Khovanov homology of slice disks

Abstract: A smooth, oriented surface that is properly embedded in the 4-ball can be regarded as a cobordism between the links it bounds, namely, the empty link and its boundary in the 3-sphere. To such link cobordisms, there is an associated linear map between the Khovanov homology groups of the boundary links, and moreover, these maps are invariant, up to sign, under boundary-preserving isotopy of the surface. In this talk, we review these maps and use their invariance to understand the existence and uniqueness of slice disks and other surfaces in the 4-ball. This reflects joint work with Jonah Swann and, separately, with Kyle Hayden.

Gage Martin, Boston College

October 1, 2021

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Joshua Howie, UC Davis

October 8, 2021

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Marissa Loving, Georgia Tech

October 15, 2021

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