Spring 2023
|
Date |
Time (Eastern) |
Speaker |
Title |
|
January 20
|
2pm Eastern
|
Nathan Sagman |
Hitchin representations and minimal surfaces
|
|
January 27
|
2pm Eastern
|
Ethan Dlugie
|
The Burau Representation and Shapes of Polyhedra
|
|
February 3
|
2pm Eastern |
Rebekah Palmer |
Totally geodesic surfaces in knot complements
|
|
February 10
|
2pm Eastern |
Lorenzo Ruffoni
|
Hyperbolization, cubulation, and applications
|
|
February 17
|
2pm Eastern |
Ty Ghaswala
|
Small covers of big surfaces
|
|
February 24
|
2pm Eastern |
Tam Cheetham-West
|
Distinguishing hyperbolic knots using finite quotients
|
|
March 3
|
2pm Eastern
|
Marissa Loving
|
Unmarked simple length spectral rigidity for covers
|
|
March 10
|
2pm Eastern |
Dan Margalit
|
A new proof of Thurston's theorem
|
|
March 17
|
2pm Eastern
|
No Seminar
|
Spring break
|
|
March 24
|
2pm Eastern
|
Beibei Liu
|
Complex-hyperbolic Kleinian groups of large critical exponents |
|
March 31
|
2pm Eastern
|
No Seminar
|
Simons Collaboration Meeting in NYC |
|
April 7 |
2pm Eastern
|
Noelle Sawyer |
|
|
April 14 |
2pm Eastern
|
potentially taken! |
potentially taken! |
|
April 21
|
2pm Eastern
|
Oyku Yurttas
|
|
|
April 28
|
2pm Eastern |
Giuseppe Martone
|
|
Abstracts
Nathaniel Sagman
Date: January 20
Title: Hitchin representations and minimal surfaces
Abstract:
Labourie proved that every Hitchin representation into PSL(n,R) gives rise to an equivariant minimal surface in the corresponding symmetric space. He conjectured that uniqueness holds as well (this was known for n=2,3) and explained that if true, then the Hitchin component admits a mapping class group equivariant parametrization as a holomorphic vector bundle over Teichmüller space. After giving the relevant background, we will explain that Labourie’s conjecture fails for n at least 4, and point to some future questions
Ethan Dlugie
Date: January 27
Title: The Burau Representation and Shapes of Polyhedra
Abstract:
The Burau representation of braid groups has been around for almost a century. Still we don't know the full answer to whether this representation is faithful. The only remaining case is for the $n=4$ braid group, and faithfulness here has intimate connections to the question of whether the Jones polynomial detects the unknot. By specializing the $t$ parameter in this representation to certain roots of unity, an interesting connection appears with the moduli space of flat cone metrics on spheres explored by Thurston. Leveraging this connection, I will explain how one can place strong restrictions on the kernel of the $n=4$ Burau representation.
Rebekah Palmer
Date: February 3
Title: Totally geodesic surfaces in knot complements
Abstract:
Studying totally geodesic surfaces has been essential in understanding the geometry and topology of hyperbolic 3-manifolds. Recently, Bader-Fisher-Miller-Stover showed that containing infinitely many such surfaces compels a manifold to be arithmetic. We are hence interested in counting totally geodesic surfaces in hyperbolic 3-manifolds in the finite (possibly zero) case. In joint work with Khánh Lê, we expand an obstruction, due to Calegari, to the existence of these surfaces. On the flipside, we prove the uniqueness of known totally geodesic surfaces by considering their behavior in the universal cover. This talk will explore this progress for both the uniqueness and the absence.
Lorenzo Ruffoni
Date: February 10th
Title: Hyperbolization, cubulation, and applications
Abstract:
A hyperbolization procedure is a construction that turns a polyhedron into a space of negative curvature, while retaining some of its topological features. Originally introduced by Gromov, these procedures have been used to construct examples of manifolds that exhibit various pathologies, despite having negative curvature. One may expect to see such pathologies also at the level of the fundamental group. On the other hand, it turns out that the fundamental groups of these hyperbolized spaces are always very well-behaved: they are linear over the integers, hence residually finite. We obtained this by showing that they admit actions on suitable CAT(0) cubical complexes with controlled stabilizers. This is joint work with J. Lafont.
Ty Ghasawala
Date: February 17th
Title: Small covers of big surfaces
Abstract:
Imagine the plane R^2 where every point with integer coordinates has been removed. Call this surface X. Which surfaces arise as finite-sheeted covers of X? Which surfaces can X cover by finitely-many sheets?
I will talk about work Alan McLeay investigating the above seemingly innocent questions, and the more general version: Given two surfaces, when does there admit a finite-sheeted cover of one over the other? A complete answer is available if the two surfaces are of finite type. In the infinite-type world, the question is less innocent than one might expect.
Tam Cheetham-West
Date: February 24th
Title: Distinguishing hyperbolic knots using finite quotients
Abstract:
The fundamental groups of knot complements have lots of finite quotients. We give a criterion for a hyperbolic knot in the three-sphere to be distinguished (up to isotopy and mirroring) from every other knot in the three-sphere by the set of finite quotients of its fundamental group, and we use this criterion as well as recent work of Baldwin-Sivek to show that there are infinitely many hyperbolic knots distinguished (up to isotopy and mirroring) by finite quotients.
Marissa Loving
Date: March 3rd
Title: Unmarked simple length spectral rigidity for covers
Abstract:
A fundamental question in geometry is the extent to which a manifold M is determined by its length spectrum, i.e. the collection of lengths of closed geodesics on M. This has been studied extensively for flat, hyperbolic, and negatively curved metrics. In this talk, we will focus on surfaces equipped with a choice of hyperbolic metric. We will explore the space between (1) work of Otal (resp. Fricke) which asserts that the marked length spectrum (resp. marked simple length spectrum) determines a hyperbolic surface, and (2) celebrated constructions of Vignéras and Sunada, which show that this rigidity fails when we forget the marking. In particular, we will consider the extent to which the unmarked simple length spectrum distinguishes between hyperbolic surfaces arising from Sunada’s construction. This represents joint work with Tarik Aougab, Max Lahn, and Nick Miller.
Dan Margalit
Date: March 10th
Title: A new proof of Thurston's theorem
Abstract:
Thurston's theorem in complex dynamics gives necessary and sufficient conditions for a branched cover of the sphere to be a rational map. After explaining the statement of the theorem, we present a new proof. The proof is an enhancement of the proof of the Nielsen-Thurston classification devised by Bers at Columbia four decades ago.
Beibei Liu
Date: March 24th
Title: Complex-hyperbolic Kleinian groups of large critical exponents.
Abstract:
A Kleinian group is a discrete isometry subgroup of hyperbolic spaces and the critical exponent is one important group invariant of Kleinian groups. It is a long-term question of whether there is a gap in the value of the critical exponent in complex hyperbolic spaces. We use complex hyperbolic surfaces constructed by Deligne-Mostow to prove that there is no gap in the values of critical exponents for the complex-hyperbolic Kleinian group. This is joint work with Subhadip Dey.
Previous semesters:
Fall 2022,
Spring 2022,
Fall 2021,
Spring 2021, Fall 2020, Spring 2020, Fall 2019, 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.