Homogeneous Dynamics and Geometry in Higher-Rank Lie Groups

Europe/Paris
Le Bois-Marie

Le Bois-Marie

Centre de conférences Marylin et James Simons 35, route de Chartres 91440 Bures-sur-Yvette
Description

Homogeneous Dynamics and Geometry in Higher-Rank Lie Groups   
The goal of the workshop is to explore links between homogeneous dynamics and recent developments on infinite-covolume discrete subgroups of Lie groups, including images of Anosov representations and generalizations. There will be three minicourses and a dozen research talks. 

This workshop is organized by Martin Bridgeman (Boston College), Richard Canary (University of Michigan), Fanny Kassel (CNRS & IHES), Hee Oh (Yale University), Maria Beatrice Pozzetti (Universität Heidelberg), and Jean-François Quint (CNRS & Université de Bordeaux).


Minicourses: 

  • Jean-François Quint (CNRS & Université de Bordeaux) - “Dynamics on Higher-rank Lie Groups” [3h] 
  • Tengren Zhang (National University of Singapore) - “Anosov Representations” [3h]
  • Andrés Sambarino (CNRS & IMJ-PRG) & Minju Lee (University of Chicago) - “Recent Developments” [2+2h]

Research Talks:

  • Pierre-Louis Blayac (University of Michigan) 
  • León Carvajales (Universidad de la Republica, Montevideo) 
  • Nguyen-Thi Dang (Université Paris-Saclay) 
  • Sam Edwards (Durham University) 
  • François Labourie (Université Côte d'Azur) 
  • Sara Maloni (University of Virginia) 
  • Giuseppe Martone (Yale University) 
  • Wenyu Pan (University of Toronto) 
  • Rafael Potrie (Universidad de la Republica, Montevideo) 
  • Pratyush Sarkar (UC San Diego) 
  • Andrew Zimmer (University of Wisconsin, Madison)   
     

 

 

Contact: Elisabeth Jasserand
    • 8:45 AM 9:30 AM
      Welcome coffee 45m
    • 9:30 AM 10:30 AM
      An Introduction to Geometry and Dynamics on Semisimple Lie Groups and Their Quotients by Discrete Subgroups (1/3) 1h

      The purpose of these lectures is to introduce certain objects and structure results on semisimple Lie groups, their structure theory, their discrete subgroups and the asymptotic behaviour of the latter.

      Speaker: Prof. Jean-François Quint (CNRS & Université de Bordeaux)
    • 10:30 AM 11:00 AM
      Coffee break 30m
    • 11:00 AM 12:00 PM
      Anosov Representations (1/3) 1h

      This minicourse is an introduction to the theory of Anosov representations for non-experts. There will be three lectures in this minicourse. In the first lecture, we will discuss Anosov representations and their various characterizations. In the second lecture, we will discuss the construction of domains of discontinuity for Anosov representations, as well as their relationship with convex projective geometry. In the final lecture, we will discuss recent developments and possible research directions for Anosov representations.

      Speaker: Prof. Tengren Zhang (National University of Singapore)
    • 12:00 PM 1:30 PM
      Lunch break 1h 30m
    • 1:30 PM 2:30 PM
      An Introduction to Geometry and Dynamics on Semisimple Lie Groups and Their Quotients by Discrete Subgroups (2/3) 1h

      The purpose of these lectures is to introduce certain objects and structure results on semisimple Lie groups, their structure theory, their discrete subgroups and the asymptotic behaviour of the latter.

      Speaker: Prof. Jean-François Quint (CNRS & Université de Bordeaux)
    • 2:30 PM 3:00 PM
      Coffee break 30m
    • 3:00 PM 4:00 PM
      Divisible Convex Sets with Properly Embedded Cones 1h

      A divisible convex set is a convex, bounded, and open subset of an affine chart of the real projective space, on which acts cocompactly a discrete group of projective transformations. These objects have a very rich theory, which involves ideas from dynamical systems, geometric group theory, (G,X)-structures, and Riemannian geometry with nonpositive curvature. Moreover, they are an important source of examples of discrete subgroups of Lie groups which are not lattices (although their construction often uses arithmetic lattices). For instance, they have links with Anosov representations.
      In this talk, we will survey known examples of divisible convex sets and the discrete groups that divide them, and then describe new examples obtained in collaboration with Gabriele Viaggi, of irreducible, non-symmetric, and non-strictly convex divisible convex sets in arbitrary dimensions (at least 3).

      Speaker: Prof. Pierre-Louis Blayac (University of Michigan)
    • 4:00 PM 4:15 PM
      Break 15m
    • 4:15 PM 5:15 PM
      Equidistribution of Periodic Tori 1h

      Bowen and Margulis independently proved in the 70s that closed geodesics on compact hyperbolic surfaces equidistribute towards the measure of maximal entropy. From a homogeneous dynamics point of view, this measure is the quotient of the Haar measure on $\mathrm{PSL}(2,\mathbb{R})$ modulo some discrete cocompact sugroup.
      In a joint work with Jialun Li, we investigate the higher rank setting of this problem by taking a higher rank Lie group (like $\mathrm{SL}(d,\mathbb{R})$ for $d\geq 3$) and by studying the dynamical properties of geodesic flows in higher rank: the so-called Weyl chamber flows and their induced diagonal action. We obtain an equidistribution formula of periodic tori (instead of closed orbits of the geodesic flow).

      Speaker: Prof. Nguyen-Thi Dang (Université Paris-Saclay)
    • 5:30 PM 6:30 PM
      Cocktail 1h
    • 9:00 AM 9:30 AM
      Welcome coffee 30m
    • 9:30 AM 10:30 AM
      An Introduction to Geometry and Dynamics on Semisimple Lie Groups and Their Quotients by Discrete Subgroups (3/3) 1h

      The purpose of these lectures is to introduce certain objects and structure results on semisimple Lie groups, their structure theory, their discrete subgroups and the asymptotic behaviour of the latter.

      Speaker: Prof. Jean-François Quint (CNRS & Université de Bordeaux)
    • 10:30 AM 11:00 AM
      Coffee break 30m
    • 11:00 AM 12:00 PM
      Anosov Representations (2/3) 1h

      This minicourse is an introduction to the theory of Anosov representations for non-experts. There will be three lectures in this minicourse. In the first lecture, we will discuss Anosov representations and their various characterizations. In the second lecture, we will discuss the construction of domains of discontinuity for Anosov representations, as well as their relationship with convex projective geometry. In the final lecture, we will discuss recent developments and possible research directions for Anosov representations.

      Speaker: Prof. Tengren Zhang (National University of Singapore)
    • 12:00 PM 1:30 PM
      Lunch break 1h 30m
    • 1:30 PM 2:30 PM
      Local Mixing of Diagonal Flows on Anosov Homogeneous Spaces 1h

      For convex cocompact (and more generally, geometrically finite) rank one locally symmetric spaces, Winter proved mixing of the frame flow with respect to the Bowen-Margulis-Sullivan measure. Mixing results in homogeneous dynamics have many applications in counting, equidistribution, and decay of matrix coefficients. For Anosov subgroups of higher rank Lie groups, the analogous Bowen-Margulis-Sullivan measures are infinite and one looks for local mixing. In a joint work with Michael Chow, we prove local mixing of one-parameter diagonal flows on Anosov homogeneous spaces, generalizing the result of Winter. We also discuss some applications including a recent result of Chow-Fromm regarding joint equidistribution of maximal flat cylinders and holonomies.

      Speaker: Prof. Pratyush Sarkar (UC San Diego)
    • 2:30 PM 3:00 PM
      Coffee break 30m
    • 3:00 PM 4:00 PM
      Geometric Structures Associated to Anosov Representations 1h

      Anosov representations can be considered a generalization of convex-cocompact representations to groups of higher-rank. In this talk, we are considering connected components of Anosov representations from the fundamental group of a closed hyperbolic manifold N, and which contains Fuchsian representations, and their associated domains of discontinuity. We will prove that the quotient of these domains of discontinuity is always smooth fiber bundles over N. Determining the topology of the fiber is hard in general, but we are able to describe it for representations in Sp(4,C), and for the domain of discontinuity in the space of complex Lagrangians in C^4 by using the classification of smooth 4-manifolds. This is joint work with Daniele Alessandrini, Nicolas Tholozan, and Anna Wienhard.

      Speaker: Prof. Sara Maloni (University of Virginia)
    • 4:00 PM 4:15 PM
      Break 15m
    • 4:15 PM 5:15 PM
      The Bottom of the $L^2$ Spectrum of Higher-rank Locally Symmetric Spaces 1h

      For a rank one geometrically finite locally symmetric space Γ\X, the bottom of the L^2 spectrum of the Laplace operator is a simple eigenvalue corresponding to a positive eigenfunction if and only if the critical exponent of Γ is strictly greater than half the volume entropy of X. In particular, there exists infinite volume rank one locally symmetric spaces with square integrable positive Laplace eigenfunctions. In contrast, a higher-rank symmetric space Γ\X without rank one factors has a square-integrable positive Laplace eigenfunction if and only Γ is a lattice. We will explain some aspects of the connection between square integrability of positive Laplace eigenfunctions and Patterson-Sullivan and Bowen-Margulis-Sullivan measures in the higher-rank setting. Based on joint work with Oh and Fraczyk-Lee-Oh.

      Speaker: Prof. Sam Edwards (Durham University)
    • 8:45 AM 9:15 AM
      Welcome coffee 30m
    • 9:15 AM 10:15 AM
      Anosov Representations (3/3) 1h

      This minicourse is an introduction to the theory of Anosov representations for non-experts. There will be three lectures in this minicourse. In the first lecture, we will discuss Anosov representations and their various characterizations. In the second lecture, we will discuss the construction of domains of discontinuity for Anosov representations, as well as their relationship with convex projective geometry. In the final lecture, we will discuss recent developments and possible research directions for Anosov representations.

      Speaker: Prof. Tengren Zhang (National University of Singapore)
    • 10:15 AM 10:45 AM
      Coffee break 30m
    • 10:45 AM 11:45 AM
      Recent Developments - Discrete Subgroups with Finite Bowen-Margulis-Sullivan Measure in Higher Rank (1/2) 1h

      Let G be a connected semisimple real algebraic group and D be its Zariski dense discrete subgroup. We prove that if D\G admits any finite Bowen-Margulis-Sullivan measure, then D is virtually a product of higher rank lattices and discrete subgroups of rank one factor of G. This may be viewed as a measure-theoretic analog of classification of convex cocompact actions by Kleiner-Leeb and Quint, which was conjectured by Corlette in 1994. This is joint work with Mikolaj Fraczyk. We will then discuss its application on the bottom of the L^2 spectrum, in joint work with Samuel Edwards, Mikolaj Fraczyk, and Hee Oh.

      Speaker: Prof. Minju Lee (University of Chicago)
    • 11:45 AM 12:00 PM
      Break 15m
    • 12:00 PM 1:00 PM
      Dynamics Associated to Anosov Representations: Some Geometric Consequences (1/2) 1h

      We will review some dynamical systems associated to an Anosov representation and draw some geometric conclusions.
      More precisely, we will review topics such as the Patterson-Sullivan Theory for these representations, the critical hypersurface, dynamical intersection, dynamics of the \theta-Weyl-chamber flow, and finally directional-conicality and generalizations.
      We will then consider the approach of dominated sequences and draw conclusions on the regularity of limit sets.
      Some relevant references are:
      lecture 1: Babillot-Ledrappier, Bridgeman-Canary-Labourie-S., Burger-Landesberg-Lee-Oh, Carvajales, Chow-Sarkar, Dey-Kapovich, Ledrappier, Lee-Oh, S.
      lecture 2: Bochi-Potrie-S., Pozzetti-S., Pozzetti-S.-Wienhard, Zhang-Zimmer.

      Speaker: Prof. Andrés Sambarino (CNRS & IMJ-PRG)
    • 9:00 AM 9:30 AM
      Welcome coffee 30m
    • 9:30 AM 10:30 AM
      Homogeneous Dynamics and u-Gibbs States 1h

      Orbit closure and measure classification results are quite central results and tools in homogeneous dynamics. Recently, new techniques provided more 'robust' approaches to this kind of results and it makes sense to try to extend some results to the non-homogeneous setting. I will try to explain what would be the natural questions in the non-linear setting and report some progress in this direction.

      Speaker: Prof. Rafael Potrie (Universidad de la Republica, Montevideo)
    • 10:30 AM 11:00 AM
      Coffee break 30m
    • 11:00 AM 12:00 PM
      Recent Developments - Horospherically Invariant Measures and a Rank Dichotomy for Anosov Groups (2/2) 1h

      Let $G$ be a product of simple real algebraic groups of rank one and $\Gamma$ be a Zariski dense and Anosov subgroup with respect to a minimal parabolic subgroup $P$. Let $N$ be the unipotent radical of $P$. For each direction $u$ in the interior of Weyl chamber, we show that there exists at most one $N$-invariant measure in $\Gamma\backslash G$ which is supported on the forward recurrent subset for the $\exp(tu)$-action. This can be viewed as a generalization of the unique ergodicity result for the horospherical action due to Furstenberg, Burger, Roblin and Winter for $\Gamma$ convex cocompact. This is joint work with Or Landesberg, Elon Lindenstrauss and Hee Oh.

      Speaker: Prof. Minju Lee (University of Chicago)
    • 12:00 PM 1:30 PM
      Lunch break 1h 30m
    • 1:30 PM 2:30 PM
      Orbit Counting Theorem for Cusped Hitchin Representations 1h

      The dynamics of a cusped Hitchin representation can be encoded by a locally Holder continuous, eventually positive, non-arithmetic potential with an entropy gap at infinity on a topologically mixing countable Markov shifts with the BIP property. After introducing and motivating these notions, I will present an orbit counting theorem for this class of shifts and potentials that, in turn, gives an orbit counting theorem for cusped Hitchin representations. This is joint work with Harry Bray, Dick Canary, and Nyima Kao.

      Speaker: Prof. Giuseppe Martone (Yale University)
    • 2:30 PM 3:00 PM
      Coffee break 30m
    • 3:00 PM 4:00 PM
      Transverse Groups 1h

      In this talk, I will discuss transverse groups (also called antipodal regular groups), a discrete group class containing the Anosov and relatively Anosov ones. I will describe a metric and flow space such a group acts on, which are analogous to the Cayley graph and the geodesic flow space of a word hyperbolic group. Then I will discuss how to use these spaces to prove new results. This represents joint work with Richard Canary and Tengren Zhang.

      Speaker: Prof. Andrew Zimmer (University of Wisconsin, Madison)
    • 4:00 PM 4:15 PM
      Break 15m
    • 4:15 PM 5:15 PM
      Dynamics Associated to Anosov Representations: Some Geometric Consequences (2/2) 1h

      We will review some dynamical systems associated to an Anosov representation and draw some geometric conclusions.
      More precisely, we will review topics such as the Patterson-Sullivan Theory for these representations, the critical hypersurface, dynamical intersection, dynamics of the \theta-Weyl-chamber flow, and finally directional-conicality and generalizations.
      We will then consider the approach of dominated sequences and draw conclusions on the regularity of limit sets.
      Some relevant references are:
      lecture 1: Babillot-Ledrappier, Bridgeman-Canary-Labourie-S., Burger-Landesberg-Lee-Oh, Carvajales, Chow-Sarkar, Dey-Kapovich, Ledrappier, Lee-Oh, S.
      lecture 2: Bochi-Potrie-S., Pozzetti-S., Pozzetti-S.-Wienhard, Zhang-Zimmer.

      Speaker: Prof. Andrés Sambarino (CNRS & IMJ-PRG)
    • 8:45 AM 9:15 AM
      Welcome coffee 30m
    • 9:15 AM 10:15 AM
      On the Dimension of Limit Sets on the Real Projective Plane via Stationary Measures 1h

      I will present a dimension jump result of limit sets on RP^2 for representations of surface groups in SL(3,R). For Anosov representations, we prove the equality between the Hausdorff dimension and the affinity dimension. In particular, it reveals a dimension jump under perturbation. The core of the proof is to study the stationary measures of finitely supported random walks on SL(3,R). We show the Hausdorff dimensions of the measures are equal to their Lyapunov dimensions under certain assumptions. This is based on ongoing joint work with Jialun Li and Disheng Xu.

      Speaker: Prof. Wenyu Pan (University of Toronto)
    • 10:15 AM 10:45 AM
      Coffee break 30m
    • 10:45 AM 11:45 AM
      Thurston's Asymmetric Metrics for Anosov Representations 1h

      The Thurston metric is an asymmetric distance on the Teichmüller space of a surface, which is computed by comparing the lengths of closed curves in the two hyperbolic structures. Thurston introduced this metric and proved many interesting properties of it, which we will briefly summarize.

      The theory of Anosov representations aims to generalize several aspects of the classical Teichmüller-Thurston theory to higher-rank representations of hyperbolic groups. For instance, Bridgeman-Canary-Labourie-Sambarino applied the Thermodynamical Formalism to the underlying geodesic flow to construct pressure metrics on some spaces of Anosov representations, which generalize the Weil-Petersson metric on Teichmüller space. In this talk, we will apply similar techniques to show that Thurston's asymmetric distance also generalizes to this setting. This is joint work with Xian Dai, Beatrice Pozzetti, and Anna Wienhard.

      Speaker: Prof. León Carvajales (Universidad de la Republica, Montevideo)
    • 11:45 AM 12:00 PM
      Break 15m
    • 12:00 PM 1:00 PM
      Ghost Polygons, Poisson Bracket and Convexity 1h

      The moduli space of Anosov representations of a surface group in a group $\mathsf G$, which is an open set in the character variety, admits many more natural functions than the regular functions: length functions, correlation functions. We compute the Poisson bracket of those functions using some combinatorial device, show that the set of those functions is stable under the Poisson bracket and give an application to the convexity of length functions, generalizing the result of Kerckhoff on Teichmüller space.
      We shall start by giving an introduction to Anosov representations, define precisely what are the functions we consider, and explain the combinatorial device involved.
      This is a joint work with Martin Bridgeman.

      Speaker: Prof. François Labourie (Université Côte d'Azur)