|Sept 13||Indira Chatterji||Group actions on median spaces and generalizations|
|Sept 20||Ty Ghaswala||Promoting circle actions to actions on the real line|
|Sept 27||Danny Calegari||Big mapping class groups and rigidity of the simple circle|
|Oct 4||Khalid Bou-Rabee||Quantifying residual finiteness|
|Oct 11||Dusa McDuff||Counting curves with tangency constraints in the complex projective plane|
|Oct 18||Margaret Nichols||Taut sutured handlebodies as twisted homology products|
|Oct 25||Francesco Lin||Hyperbolic four-manifolds with vanishing Seiberg-Witten invariants|
|Nov 1||Abdul Zalloum||CAT(0) groups are determined by sublinear boundaries|
|Nov 8||Nick Vlamis|
|Nov 15||Peter Lambert-Cole|
|Nov 22||Diana Hubbard|
|Dec 6||Jingyin Huang|
|Dec 13||Maggie Miller|
Abdul Zalloum, Queens University
November 1, 2019
Title: CAT(0) groups are determined by sublinear boundaries
Abstract: To each hyperbolic space, one can associate a space at infinity called the Gromov’s boundary. Gromov showed that a quasi-isometry between two hyperbolic spaces induces a homeomorphism on their boundaries. For a CAT(0) space, one can also assign a space at infinity called the visual boundary but that is no longer a quasi-isometry invariant. Several attempts have been made to circumvent the problem, most recent of which is work by Qing and Rafi. They introduce the notion of a ”sublinear contracting boundary” of a CAT(0) space and they show that a quasi-isometry between two CAT(0) spaces induces a homeomorphism between their sublinear boundaries. We investigate when the converse holds: Given a homeomorphism between two sublinear boundaries of CAT(0) spaces, when is it induced by a quasi isometry? We show that a homeomorphism f between two cocompact CAT(0) spaces f:X-->Y is induced by a quasi-isometry if and only if f is stable and Morse quasi-Mobius. In this talk, I will define all the objects above and give a sketch for the proof. This is joint work with Yulan Qing.
Francesco Lin, Columbia
October 25, 2019
Title: Hyperbolic four-manifolds with vanishing Seiberg-Witten invariants
Abstract: We show the existence of hyperbolic 4-manifolds with vanishing Seiberg-Witten invariants, addressing a conjecture of Claude LeBrun. This is achieved by showing, using results in geometric and arithmetic group theory, that certain hyperbolic 4-manifolds contain L-spaces as hypersurfaces. This is joint work with Ian Agol.
Margaret Nichols, SUNY Buffalo
October 18, 2019
Title: Taut sutured handlebodies as twisted homology products
Abstract: A basic problem in the study of 3-manifolds is to determine when geometric objects are of ‘minimal complexity’. We are interested in this question in the setting of sutured manifolds, where minimal complexity is called ‘tautness’.
We explore the case of sutured handlebodies, and see even among the simplest class of these, twisting is required. We give examples that, when restricted to solvable representations, the twisting representation cannot be ‘too simple’.
Dusa McDuff, Columbia
October 11, 2019
Title: Counting curves with tangency constraints in the complex projective plane
Abstract: The attempt to prove the stabilized ellipsoidal symplectic embedding problem has lead to some very interesting questions about the behavior of genus zero pseudo-holomorphic curves in $\C P^2$. In particular, it seems that one can generalize the Caporaso--Harris recursion formula that counts curves tangent to a global divisor to cases where one also allows tangencies to local divisors. I will explain the embedding problem, the relevance of curve counts to it, and then explain some recent joint work with Kyler Siegel that develops new ways to perform these counts. The talk will assume no special knowledge of symplectic geometry.
Khalid Bou-Rabee, CUNY
October 4, 2019
Title: Quantifying residual finiteness
Abstract: The theory of quantifying residual finiteness assigns, to each finitely generated group, an invariant that indicates how well-approximated the group is by its finite quotients. We introduce this theory and survey the current state of the subject. There will be a strong emphasis on examples, open questions, and connections to other subjects.
Danny Calegari, University of Chicago
September 27, 2019
Title: Big mapping class groups and rigidity of the simple circle
Abstract: Let G denote the mapping class group of the plane minus a Cantor set. We show that every action of G on the circle is either trivial or semi-conjugate to a unique minimal action on the so-called simple circle. This is joint work with Lvzhou (Joe) Chen.
Ty Ghaswala, University of Manitoba
September 20, 2019
Title: Promoting circle actions to actions on the real line
Abstract: Circularly-orderable and left-orderable groups play an important, and sometimes surprising, role in low-dimensional topology and geometry. For example, these combinatorial conditions completely characterize when a countable group acts on a 1-manifold. Through the so-called L-space conjecture, left-orderability of the fundamental group of a rational homology 3-sphere is connected to the existence of taut foliations and properties of its Heegaard Floer homology. I will present new necessary and sufficient conditions for a circularly-orderable group to be left-orderable, and introduce the obstruction spectrum of a circularly-orderable group. This raises a plethora of intriguing questions, especially in the case when the group is the fundamental group of a manifold.
This is joint work with Jason Bell and Adam Clay.
Indira Chatterji, CNRS
September 13, 2019
Title: Group actions on median spaces and generalizations
Abstract: Median spaces are a natural generalization of R-trees and CAT(0) cubical complexes. I will define the notion, discuss the context and show that the fundamental group of a compact hyperbolic manifold acts properly and cocompactly on a median space.
Spring 2019, Fall 2018, Spring 2018, Fall 2017, Spring 2017, 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.