Seminars and Colloquia by Series

Bounding non-integral non-characterizing Dehn surgeries

Series
Geometry Topology Seminar
Time
Monday, December 2, 2024 - 14:00 for 1 hour (actually 50 minutes)
Location
Skiles 006
Speaker
Patricia SoryaUQAM

A Dehn surgery slope p/q is said to be characterizing for a knot K if the homeomorphism type of the p/q-Dehn surgery along K determines the knot up to isotopy. I discuss advances towards a conjecture of McCoy that states that for any knot, all but at most finitely many non-integral slopes are characterizing.

Chaos in polygonal billiards

Series
Job Candidate Talk
Time
Monday, December 2, 2024 - 11:00 for 1 hour (actually 50 minutes)
Location
Skiles 006
Speaker
Francisco Arana-HerreraUniversity of Maryland

We discuss how chaos, i.e., sensitivity to initial conditions, arises in the setting of polygonal billiards. In particular, we give a complete classification of the rational polygons whose billiard flow is weak mixing in almost every direction, proving a longstanding conjecture of Gutkin. This is joint work with Jon Chaika and Giovanni Forni. No previous knowledge on the subject will be assumed.

Induced subgraphs of graphs of large K_r-free chromatic number (Aristotelis Chaniotis)

Series
Graph Theory Seminar
Time
Tuesday, November 26, 2024 - 15:30 for 1 hour (actually 50 minutes)
Location
Skiles 005
Speaker
Aristotelis ChaniotisUniversity of Waterloo

For an integer $r\geq 2$, the $K_{r}$-free chromatic number of a graph $G$, denoted by $\chi_{r}(G)$, is the minimum size of a partition of the set of vertices of $G$ into parts each of which induces a $K_{r}$-free graph. In this setting, the $K_{2}$-free chromatic number is the usual chromatic number.

Which are the unavoidable induced subgraphs of graphs of large $K_{r}$-free chromatic number? Generalizing the notion of $\chi$-boundedness, we say that a hereditary class of graphs is $\chi_{r}$-bounded if there exists a function which provides an upper bound for the $K_{r}$-free chromatic number of each graph of the class in terms of the graph's clique number. 

With an emphasis on a generalization of the Gy\'arf\'as-Sumner conjecture for $\chi_{r}$-bounded classes of graphs and on polynomial $\chi$-boundedness, I will discuss some recent developments on $\chi_{r}$-boundedness and related open problems. 

Based on joint work with Mathieu Rundstr\"om and Sophie Spirkl, and with Bartosz Walczak.
 

Prym Representations and Twisted Cohomology of the Mapping Class Group with Level Structures

Series
Geometry Topology Seminar
Time
Monday, November 25, 2024 - 14:00 for 1 hour (actually 50 minutes)
Location
Skiles 006
Speaker
Xiyan ZhongNotre Dame

The Prym representations of the mapping class group are an important family of representations that come from abelian covers of a surface. They are defined on the level-ℓ mapping class group, which is a fundamental finite-index subgroup of the mapping class group.  One consequence of our work is that the Prym representations are infinitesimally rigid, i.e. they can not be deformed. We prove this infinitesimal rigidity by calculating the twisted cohomology of the level-ℓ mapping class group with coefficients in the Prym representation, and more generally in the r-tensor powers of the Prym representation. Our results also show that when r ≥ 2, this twisted cohomology does not satisfy cohomological stability, i.e. it depends on the genus g.

Efficient, Robust, and Agnostic Generative Modeling with Group Symmetry and Regularized Divergences

Series
Applied and Computational Mathematics Seminar
Time
Monday, November 25, 2024 - 14:00 for 1 hour (actually 50 minutes)
Location
Skiles 005 and https://gatech.zoom.us/j/94954654170
Speaker
Ziyu ChenUniversity of Massachusetts Amherst

In this talk, I will discuss our recent theoretical advancements in generative modeling. The first part of the presentation will focus on learning distributions with symmetry. I will introduce results on the sample complexity of empirical estimations of probability divergences for group-invariant distributions, and present performance guarantees for GANs and score-based generative models that incorporate symmetry. Notably, I will offer the first quantitative comparison between data augmentation and directly embedding symmetry into models, highlighting the latter as a more fundamental approach for efficient learning. These findings underscore how incorporating symmetry into generative models can significantly enhance learning efficiency, particularly in data-limited scenarios. The second part will cover $\alpha$-divergences with Wasserstein-1 regularization. These divergences can be interpreted as $\alpha$-divergences constrained to Lipschitz test functions in their variational form. I will demonstrate how generative learning can be made agnostic to assumptions about target distributions, including those with heavy tails or low-dimensional and fractal supports, through the use of these divergences as objective functionals. I will outline the conditions for the finiteness of these divergences under minimal assumptions on the target distribution along with the variational derivatives and gradient flow formulation associated with them. This framework provides guarantees for various machine learning algorithms that optimize over this class of divergences. 

Non-escape of mass for QUE in hyperbolic 4-manifolds

Series
CDSNS Colloquium
Time
Friday, November 22, 2024 - 15:30 for 1 hour (actually 50 minutes)
Location
Skiles 314
Speaker
Alexandre Perozim de FaveriStanford University

The arithmetic quantum unique ergodicity (AQUE) conjecture predicts that the L^2 mass of Hecke-Maass cusp forms on an arithmetic hyperbolic manifold becomes equidistributed as the Laplace eigenvalue grows. If the underlying manifold is non-compact, mass could “escape to infinity”. This possibility was ruled out by Soundararajan for arithmetic surfaces, which when combined with celebrated work of Lindenstrauss completed the proof of AQUE for surfaces.

We establish non-escape of mass for Hecke-Maass cusp forms on a congruence quotient of hyperbolic 4-space. Unlike in the setting of hyperbolic 2- or 3-manifolds (for which AQUE has been proved), the number of terms in the Hecke relations is unbounded, which prevents us from naively applying Cauchy-Schwarz. We instead view the isometry group as a group of quaternionic matrices, and rely on non-commutative unique factorization, along with certain structural features of the Hecke action. Joint work with Zvi Shem-Tov.

 

Multidimensional local limit theorem in deterministic systems and an application to non-convergence of polynomial multiple averages - NOTE IRREGULAR TIME/DATE

Series
CDSNS Colloquium
Time
Thursday, November 21, 2024 - 16:00 for 1 hour (actually 50 minutes)
Location
Skiles 314
Speaker
Shrey SanadhyaHebrew University

In this talk, for an ergodic probability preserving system $(X,\mathcal{B},m,T)$, we will discuss the existence of a function $f:X\to \mathbb{Z}^d$, whose corresponding cocycle satisfies the $d$-dimensional local central limit theorem.
As an application, we resolve a question of Huang, Shao and Ye, and Franzikinakis and Host regarding non-convergence in $L^2$ of polynomial multiple averages of non-commuting zero entropy transformations. If time allows, we will also discuss the first examples of failure of multiple recurrence for zero entropy transformations along polynomial iterates. This is joint work with Zemer Kosloff (arXiv:2409.05087). 

On the Houdré-Tetali conjecture about an isoperimetric constant of graphs and Cheeger's inequality

Series
Stochastics Seminar
Time
Thursday, November 21, 2024 - 15:30 for 1 hour (actually 50 minutes)
Location
Skiles 006
Speaker
Lap Chi LauUniversity of Waterloo

Houdré and Tetali defined a class of isoperimetric constants phi_p of graphs for 1/2 <= p <= 1.  When p=1, the classical Cheeger's inequality relates phi_1 to the second smallest eigenvalue of the normalized Laplacian matrix.  Houdré and Tetali conjectured that a similar Cheeger-type inequality holds for p=1/2, which if true would be a strengthening of Cheeger's inequality.  Morris and Peres proved the Houdré-Tetali conjecture up to an additional log factor, using techniques from evolving sets.  In this talk, we discuss the following results about this conjecture:

  - There is a family of counterexamples to the conjecture of Houdré and Tetali, showing that the logarithmic factor is needed.

  - Morris and Peres' result can be recovered using standard spectral arguments. 

  - The Houdré-Tetali conjecture is true for any constant p strictly bigger than 1/2, which is also a strengthening of Cheeger's inequality.

If time permits, we also discuss other strengthenings of Cheeger's inequality.  No background is assumed from the audience.

Wronski map and totally non-negative Grassmannians

Series
School of Mathematics Colloquium
Time
Thursday, November 21, 2024 - 11:00 for 1 hour (actually 50 minutes)
Location
Skiles 005
Speaker
Evgeny MukhinIndiana University Indianapolis

The totally non-negative Grassmannian is the set of points in a real Grassmannian such that all Plucker coordinates have the same sign (some can be zero). I will show how points in totally non-negative Grassmannians arise from the spaces of polynomials in one variable whose Wronskian has only real roots. Then I will discuss a similar result for the spaces of quasi-exponentials.

The main statements of this talk should be understandable to an undergraduate student. Somewhat surprisingly, the proofs use the theory of quantum integrable systems related to $GL(n)$. I will try to explain the logic of such proofs in a gentle way.

This talk is based on a joint work with S. Karp and V. Tarasov.

Non-vanishing for cubic Hecke L-functions

Series
Number Theory
Time
Wednesday, November 20, 2024 - 15:30 for 1 hour (actually 50 minutes)
Location
Skiles 005
Speaker
Alexandre Perozim de FaveriStanford University

 I will discuss recent work with Chantal David, Alexander Dunn, and Joshua Stucky, in which we prove that a positive proportion of Hecke L-functions associated to the cubic residue symbol modulo squarefree Eisenstein integers do not vanish at the central point. Our principal new contribution is the asymptotic evaluation of the mollified second moment with power saving error term. No such asymptotic formula was previously known for a cubic family (even over function fields). Our new approach makes crucial use of Patterson's evaluation of the Fourier coefficients of the cubic metaplectic theta function, Heath-Brown's cubic large sieve, and a Lindelöf-on-average upper bound for the second moment of cubic Dirichlet series that we establish. The significance of our result is that the (unitary) family considered does not satisfy a perfectly orthogonal large sieve bound. This is quite unlike other families of Dirichlet L-functions for which unconditional results are known (namely the symplectic family of quadratic characters and the unitary family of all Dirichlet characters modulo q). Consequently, our proof has fundamentally different features from the corresponding works of Soundararajan and of Iwaniec and Sarnak.

Pages