Seminars and Colloquia by Series

Injective norm of random tensors and quantum states

Series
Stochastics Seminar
Time
Thursday, April 3, 2025 - 15:30 for 1 hour (actually 50 minutes)
Location
Skiles 006
Speaker
Stephane DartoisUniversité Paris-Saclay, CEA, List

In this talk, I will present the results of a collaboration with Benjamin McKenna on the injective norm of large random Gaussian tensors and uniform random quantum states, and describe some of the context underlying this work. The injective norm is a natural generalization to tensors of the operator norm of a matrix and appears in multiple fields. In quantum information, the injective norm is one important measure of genuine multipartite entanglement of quantum states, known as geometric entanglement. In our preprint, we provide a high-probability upper bound on the injective norm of real and complex Gaussian random tensors, which corresponds to a lower bound on the geometric entanglement of random quantum states, and to a bound on the ground-state energy of a particular multispecies spherical spin glass model.

Geometric representation of multi-dimensional data and its applications

Series
Dissertation Defense
Time
Thursday, April 3, 2025 - 08:00 for 1.5 hours (actually 80 minutes)
Location
Skiles 114
Speaker
Ho LawGeorgia Institute of Technology

This thesis presents several contributions to the fields of image and geometry processing. In 2D image processing, we propose a method that not only computes the relative depth of objects in bitmap format but also inpaints occluded regions using a PDE-based model and vector representation. Our approach demonstrates both qualitative and quantitative advantages over the state-of-the-art depth-aware bitmap-to-vector conversion models.

In the area of 3D point cloud processing, we introduce a method for generating a robust normal vector field that preserves first order discontinuity while being resistant to noise, supported by a degree of theoretical guarantee. This technique has potential applications in solving PDEs on point clouds, detecting sharp features, and reconstructing surfaces from incomplete and noisy data.

Additionally, we present a dedicated work on surface reconstruction from point cloud data. While many existing models can reconstruct implicit surfaces and some include denoising capabilities, a common drawback is the loss of sharp features: edges and corners are often smoothed out in the process. To address this limitation, we propose a method that not only denoises but also preserves sharp edges and corners during surface reconstruction from noisy data.

Cost Theory and Geometric Dualities

Series
Analysis Seminar
Time
Wednesday, April 2, 2025 - 14:00 for 1 hour (actually 50 minutes)
Location
Skiles 005
Speaker
Shay SadovskyCourant Institute

In the classical theory of optimal transport, Legendre duality arises naturally, as seen for example in Kantorovich’s duality theorem. Extending this idea to a general cost function naturally leads to a broader notion of functional cost-duality and the associated class of c-functions.

Similarly, in the setting of sets, taking polars provides an analogous notion of duality, mapping to the class of convex sets. In this talk, I will introduce cost dualities for sets and show that they correspond precisely to all order-reversing involutions on sets. Finally, I will explore the connections between c-duality and various geometric and functional inequalities.

Generalized Olson-Zalik Conjecture

Series
Analysis Seminar
Time
Wednesday, April 2, 2025 - 14:00 for 1 hour (actually 50 minutes)
Location
Skiles 005
Speaker
Pu-Ting YuUniversity of Oregon

In 1992, Olson and Zalik conjectured that no system of translates can be a Schauder basis for L^2(R). This conjecture remains open as of the time of writing. Although some partial results regarding Olson-Zalik conjecture have been proved to be true, a characterization of subspaces of L^2(R) that do not admit a Schauder basis, or an unconditional basis is still unknown. 

In this talk, we will begin with a brief introduction to Olson-Zalik conjecture including its recent development. Then we will show that a family of modulation spaces do not admit unconditional bases formed by a system of translates. This observation led us to the following generalized Olson-Zalik conjecture ``Assume X is a separable Banach space that is continuously embedded into L^2(R). Then X does not admit a Schauder basis of translates if it is closed under Fourier transform". Finally, we close this talk by showing that if a closed subspace of L^2(R) is closed under Fourier transform, then it does not admit a Schauder basis of certain translates.

Manin's conjecture for Châtelet surfaces

Series
Athens-Atlanta Number Theory Seminar
Time
Tuesday, April 1, 2025 - 17:15 for 1 hour (actually 50 minutes)
Location
Skiles 314
Speaker
Katherine WooPrinceton University

We resolve Manin's conjecture for all Châtelet surfaces over $\mathbb{Q}$ (surfaces given by equations of the form x^2 + ay^2 = f(z)) -- we establish asymptotics for the number of rational points of increasing height. The key analytic ingredient is estimating sums of Fourier coefficients of modular forms along polynomial values.

Hilbert 10 via additive combinatorics

Series
Athens-Atlanta Number Theory Seminar
Time
Tuesday, April 1, 2025 - 16:00 for 1 hour (actually 50 minutes)
Location
314 Skiles
Speaker
Carlo Pagano Concordia University

 

In 1970 Matiyasevich, building on earlier work of Davis--Putnam--Robinson, proved that every enumerable subset of Z is Diophantine, thus showing that Hilbert's 10th problem is undecidable for $\mathbb{Z}$. The problem of extending this result to the ring of integers of number fields (and more generally to finitely generated infinite rings) has attracted significant attention and, thanks to the efforts of many mathematicians, the task has been reduced to the problem of constructing, for certain quadratic extensions of number fields $L/K$, an elliptic curve $E/K$ with $rk(E(L))=rk(E(K))>0$. 

In this talk I will explain joint work with Peter Koymans, where we use Green--Tao to construct the desired elliptic curves, settling Hilbert 10 for every finitely generated infinite ring.

Recovery of Schrödinger nonlinearities from the scattering map

Series
PDE Seminar
Time
Tuesday, April 1, 2025 - 15:30 for 1 hour (actually 50 minutes)
Location
Skiles 005
Speaker
Jason MurphyUniversity of Oregon

We will discuss time-dependent, nonlinear “inverse scattering” in the setting of nonlinear Schrödinger equations.  In particular, we will show that it is possible to recover an unknown nonlinearity from the small-data scattering behavior of solutions.  Time permitting, we will also discuss stability estimates for reconstruction, as well as recovery from modified scattering behavior.  This talk will include some joint work with R. Killip and M. Visan, as well as with G. Chen.

Accelerated materials innovation using AI/ML and Digital Twins

Series
GT-MAP Seminar
Time
Tuesday, April 1, 2025 - 10:00 for 2 hours
Location
Skiles 006
Speaker
Prof. Surya R. KalidindiGeorgia Tech ME, CSE & MSE

Please Note: In person

This presentation will expound the challenges involved in the generation of digital twins (DT) as valuable tools for supporting innovation and providing informed decision support for the optimization of properties and/or performance of advanced material systems. This presentation will describe the foundational AI/ML (artificial intelligence/machine learning) concepts and frameworks needed to formulate and continuously update the DT of a selected material system. The central challenge comes from the need to establish reliable models for predicting the effective (macroscale) functional response of the heterogeneous material system, which is expected to exhibit highly complex, stochastic, nonlinear behavior. This task demands a rigorous statistical treatment (i.e., uncertainty reduction, quantification and propagation through a network of human-interpretable models) and fusion of insights extracted from inherently incomplete (i.e., limited available information), uncertain, and disparate (due to diverse sources of data gathered at different times and fidelities, such as physical experiments, numerical simulations, and domain expertise) data used in calibrating the multiscale material model. This presentation will illustrate with examples how a suitably designed Bayesian framework combined with emergent AI/ML toolsets can uniquely address this challenge.

TBD

Series
Geometry Topology Seminar
Time
Monday, March 31, 2025 - 14:00 for 1 hour (actually 50 minutes)
Location
Skiles 006
Speaker
Ryan DickmannVanderbilt

TBD

Latent neural dynamics for fast data assimilation with sparse observations

Series
Applied and Computational Mathematics Seminar
Time
Monday, March 31, 2025 - 14:00 for 1 hour (actually 50 minutes)
Location
Skiles 005 and https://gatech.zoom.us/j/94954654170
Speaker
Peng ChenGeorgia Tech CSE

Data assimilation techniques are crucial for correcting trajectories when modeling complex dynamical systems. The Latent Ensemble Score Filter (Latent-EnSF), our recently developed data assimilation method, has shown great promise in high-dimensional and nonlinear data assimilation problems with sparse observations. However, this method faces the challenge of high computational cost due to the expensive forward simulation. In this talk, we present Latent Dynamics EnSF (LD-EnSF), a novel methodology that evolves the neural dynamics in a low-dimensional latent space and significantly accelerates the data assimilation process.

 

To achieve this, we introduce a novel variant of Latent Dynamics Networks (LDNets) to effectively capture the system's dynamics within a low-dimensional latent space. Additionally, we propose a new method for encoding sparse observations into the latent space using recurrent neural networks. We demonstrate the robustness, accuracy, and efficiency of the proposed methods and their limitations for complex dynamical systems with highly sparse (in both space and time) and noisy observations, including shallow water wave propagation for tsunami modeling, FourCastNet in numerical weather prediction, and Kolmogorov flow that exhibits chaotic and turbulent phenomena.

Pages