2008 | 2009 | 2010 | 2011 | 2012 | 2013 | 2014 | 2015 | 2016 | 2017
Current contact: Dave Futer or Matthew Stover
The Seminar usually takes place on Wednesdays at 2:30 PM in Room 617 on the sixth floor of Wachman Hall.
Ivan Levcovitz, CUNY Graduate Center
Abstract: The divergence function of a metric space, a quasi-isometry invariant, roughly measures the rate that pairs of geodesic rays stray apart. We will present new results regarding divergence functions of CAT(0) cube complexes. Right-angled Coxeter groups, in particular, exhibit a rich spectrum of possible divergence functions, and we will give special focus to applications of our results to these groups. Applications to the theory of random right-angled Coxeter groups will also be briefly discussed.
Carolyn Abbott, University of Wisconsin
Abstract: Given a finitely generated group, one can look for an acylindrical action on a hyperbolic space in which all elements that are loxodromic for some acylindrical action of the group are loxodromic for this particular action. Such an action is called a universal acylindrical action and, for acylindrically hyperbolic groups, tends to give a lot of information about the group. 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.
Thomas Church, Stanford/IAS
PATCH seminar (organized by Bryn Mawr, Haverford, Penn, and Temple)
Abstract: Borel proved that in low dimensions, the cohomology of a locally symmetric space can be represented not just by harmonic forms but by invariant forms. This implies that the \(k\)-th rational cohomology of \(SL_n(Z)\) is independent of \( n\) in a linear range \(n \geq c k\), and tells us exactly what this "stable cohomology" is. In contrast, very little is known about the unstable cohomology, in higher dimensions outside this range.
In this talk I will explain a conjecture on a new kind of stability in the unstable cohomology of arithmetic groups like \(SL_n(Z)\). These conjectures deal with the "codimension-k" cohomology near the top dimension (the virtual cohomological dimension), and for \( SL_n(Z)\) they imply the cohomology vanishes there. Although the full conjecture is still open, I will explain how we proved it for codimension-0 and codimension-1. The key ingredient is a version of Poincare duality for these groups based on the algebra of modular symbols, and a new presentation for modular symbols. Joint work with Benson Farb and Andrew Putman.
Denis Auroux, UC Berkeley/IAS
PATCH seminar (organized by Bryn Mawr, Haverford, Penn, and Temple)
Abstract: A basic open problem in symplectic topology is to classify Lagrangian submanifolds (up to, say, Hamiltonian isotopy) in a given symplectic manifold. In recent years, ideas from mirror symmetry have led to the realization that even the simplest symplectic manifolds (eg. vector spaces or complex projective spaces) contain many more Lagrangian tori than previously thought. We will present some of the recent developments on this problem, and discuss some of the connections (established and conjectural) between Lagrangian tori, cluster mutations, and toric degenerations, that arise out of this story.
William Worden, Temple University
Abstract: Certain fibered hyperbolic 3-manifolds admit a layered veering triangulation, which can be constructed algorithmically given the stable lamination of the monodromy. These triangulations were introduced by Agol in 2011, and have been further studied by several others in the years since. We present experimental results which shed light on the combinatorial structure of veering triangulations, and its relation to certain topological invariants of the underlying manifold. We will begin by discussing essential background material, including hyperbolic manifolds and ideal triangulations, and more particularly fibered hyperbolic manifolds and the construction of the veering triangulation.
Davi Maximo, University of Pennsylvania
Abstract: In this talk we will give a precise picture on how a sequence of minimal surfaces with bounded index might degenerate on a given closed three-manifold. As an application, we prove several compactness results.
William Goldman, University of Maryland
The general theory of locally homogeneous geometric structures (flat Cartan connections) originated with Ehresmann's 1936 paper ``Sur les espaces localement homogènes''. Their classification leads to interesting dynamical systems.
For example, classifying Euclidean geometries on the torus leads to the usual action of the SL(2,Z) on the upper halfplane. This action is dynamically trivial, with a quotient space the familiar modular curve. In contrast, the classification of other simple geometries on the torus leads to the standard linear action of SL(2,Z) on R^2, with chaotic dynamics and a pathological quotient space. This talk describes such dynamical systems, where the moduli space is described by the nonlinear symmetries of cubic equations like Markoff’s equation x^2 + y^2 + z^2 = x y z.
Both trivial and chaotic dynamics arise simultaneously, relating to possibly singular hyperbolic metrics on surfaces of Euler characteristic 1.
Sara Maloni, University of Virginia
PATCH seminar (organized by Bryn Mawr, Haverford, Penn, and Temple)
In 1832 Steiner asked for a characterization of polyhedra which can be inscribed in quadrics. In 1992 Rivin answered in the case of the sphere, using hyperbolic geometry. In this talk, I will describe the complete answer to Steiner's question, which involves the study of interesting analogues of hyperbolic geometry including anti de Sitter geometry. Time permitting, we will also discuss future directions in the study of convex hyperbolic and anti de Sitter manifolds. This is joint work with J. Danciger and J.-M. Schlenker.
In the morning talk (at 9:30am), I will recall the idea of a geometric structure and the definitions of hyperbolic and anti de Sitter geometry. I will also explain hyperbolic quasi-Fuchsian manifolds and their AdS analogues.
Laura Starkston, Stanford University
PATCH seminar (organized by Bryn Mawr, Haverford, Penn, and Temple)
Weinstein manifolds are an important class of symplectic manifolds with convex ends/boundary. These 2n dimensional manifolds come with a retraction onto a core n-dimensional stratified complex called the skeleton, which generally has singularities. The topology of the skeleton does not generally determine the smooth or symplectic structure of the 2n dimensional Weinstein manifold. However, if the singularities fall into a simple enough class (Nadler’s arboreal singularities), the whole Weinstein manifold can be recovered just from the data of the n-dimensional complex. We discuss work in progress showing that every Weinstein manifold can be homotoped to have a skeleton with only arboreal singularities (focusing in low-dimensions). This has significance for combinatorially computing deep invariants of symplectic manifolds like the Fukaya category.
In the morning background talk (at 11:00), I will discuss the original example of a symplectic manifold: the cotangent bundle \(T^*M\) of any smooth manifold \(M\).
Samuel Taylor, Yale University
Abstract: Consider a nonelementary action by isometries of a hyperbolic group \(G\) on a hyperbolic metric space \(X\). Besides the action of \(G\) on its Cayley graph, some examples to bear in mind are actions of \(G\) on trees and quasi-trees, actions on nonelementary hyperbolic quotients of \(G\), or examples arising from naturally associated spaces, like subgroups of the mapping class group acting on the curve graph.
We show that the set of elements of \(G\) which act as loxodromic isometries of \(X\) (i.e those with sink-source dynamics) is generic. That is, for any finite generating set of \(G\), the proportion of \(X\)-loxodromics in the ball of radius n about the identity in \(G\) approaches 1 as n goes to infinity. We also establish several results about the behavior in \(X\) of the images of typical geodesic rays in \(G\); for example, we prove that they make linear progress in \(X\) and converge to the boundary of \(X\). Our techniques make use of the automatic structure of \(G\), Patterson-Sullivan measure, and the ergodic theory of randoms walks for groups acting on hyperbolic spaces. This is joint work with I. Gekhtman and G. Tiozzo.
David Treumann, Boston College
PATCH Seminar (organized by Bryn Mawr, Haverford, Penn, and Temple)
Abstract: I will discuss an approach using microlocal sheaf theory to study Legendrian surfaces in \(S^5\) and their Lagrangian fillings in \(R^6\). This talk is based on joint work with Eric Zaslow and Linhui Shen about open Gromov-Witten invariants in \(R^6\).
MORNING BACKGROUND TALK: The first talk will explain some basic notions about sheaves, Legendrians, and Lagrangians. The background talk takes place at 9:30 AM in in the Science Library (KINSC H305C),
Anastasiia Tsvietkova, Rutgers University Newark
PATCH Seminar (organized by Bryn Mawr, Haverford, Penn, and Temple)
Abstract: Hyperbolic volume is a powerful invariant of hyperbolic 3-manifolds. For 3-manifolds that are not hyperbolic, simplicial volume, that is closely related to Gromov norm, can be seen as a generalization of hyperbolic volume. The hyperbolic volume of a link complement in a 3-sphere is known to be unchanged when a half-twist is added to a link diagram, and a suitable 3-punctured sphere is present in the complement. We generalize this to the simplicial volume of link complements by analyzing the corresponding toroidal decompositions. We then use it to prove a refined upper bound for the (simplicial and hyperbolic) volume in terms of twists of various lengths in a link diagram. The bound found an application in the work relating coefficients of the colored Jones polynomial to volume, in the spirit of the Volume Conjecture. This is a joint work with Oliver Dasbach.
MORNING BACKGROUND TALK: In this background talk, I will discuss incompressible surfaces in 3-manifolds, decomposing 3-manifolds along spheres and tori, and hyperbolic and simplicial volume. The background talk takes place at 11:30 AM in in the Science Library (KINSC H305C),
Michael Magee, Yale University
Abstract: I'll discuss some recent results on the Markoff-Hurwitz equation. I'll give some explanation about the fundamental relationship between this equation and geometry. We recently obtained a true asymptotic formula for the number of integer points of bounded height on the Markoff-Hurwitz variety in at least 4 variables. The previous best result here was by Baragar (1998) that gives a rough polylogarithmic rate of growth with a mysterious exponent of growth that is not in general an integer. As a consequence of our work we obtain an asymptotic formula for the number of one sided simple closed curves of given length on a certain hyperbolic thrice punctured projective plane. This is joint work with Gamburd and Ronan. If time permits I'll also report on recent work on the dynamics of pseudo-Anosov automorphisms of the Markoff surface over finite fields. This is joint work with undergraduate students Cerbu, Gunther and Peilen. I'll also try to point out some interesting open questions.
Matthew Stover, Temple
I will talk about arithmetic geometry of SL(2,C) character varieties of hyperbolic knots. A simple criterion on roots of the Alexander polynomial determines whether or not a natural construction extends to determine a so-called Azumaya algebra on the so-called canonical component of the character variety, and I'll then explain how this forces significant restrictions on arithmetic invariants of Dehn surgeries on the knot. This is joint work with Ted Chinburg and Alan Reid.
Renato Bettiol, University of Pennsylvania
Classical geometric applications of Weitzenböck formulae establish that manifolds with positive Ricci curvature have vanishing first Betti number, while manifolds with negative Ricci curvature have no nontrivial Killing vector fields. In this talk, I will describe a framework to produce more general Weitzenböck formulae due to Hitchin, and derive two geometric applications that regard sectional curvature. The first implies a certain geometric restriction on 4-manifolds with positive sectional curvature and indefinite intersection form; the second provides a characterization of nonnegative sectional curvature in terms of Weitzenböck formulae for symmetric tensors. These methods potentially yield applications to negatively curved manifolds as well. This is joint work with R. Mendes (WWU Münster).
Irene Pasquinelli, Durham
Finding lattices in \(PU(n,1)\) has been one of the major challenges of the last decades. One way of constructing lattices is to give a fundamental domain for its action on the complex hyperbolic space.
One approach, successful for some lattices, consists of seeing the complex hyperbolic space as the configuration space of cone metrics on the sphere and of studying the action of some maps exchanging the cone points with same cone angle.
In this talk we will see how this construction of fundamental polyhedra can be extended to almost all Deligne-Mostow lattices with 3-fold symmetry. Time permitting, we will see how this can be extended to Deligne-Mostow lattices with 2-fold symmetry (work in progress).
Please note the change of location this week.
Giulio Tiozzo, University of Toronto
Abstract: Let \(G\) be a group of isometries of a hyperbolic space \(X\). If \(X\) is not proper (e.g., a locally infinite graph), a weak form of properness is given by the WPD (weak proper discontinuity) condition, as defined by Bestvina-Bromberg-Fujiwara.
We consider random walks on groups which act weakly properly discontinuously on a hyperbolic space, and prove that the topological (Gromov) boundary is a model for the measure-theoretic (Poisson) boundary.
This provides as a corollary an identification of the Poisson boundary of \(Out(F_n)\) without using the theory of outer space. Joint work with J. Maher.
2008 | 2009 | 2010 | 2011 | 2012 | 2013 | 2014 | 2015 | 2016 | 2017