Abstracts
Week of April 12, 2026
| Geometric Analysis and Application | Uniqueness of mean curvature flow evolution |
3:45pm -
KT 906
|
The smooth mean curvature flow often develops singularities, making weak solutions essential for extending the flow beyond singular times. Among various weak formulations, the level set flow method is notable for ensuring long-time existence and uniqueness. However, this comes at the cost of potential fattening, which reflects genuine non-uniqueness of the evolution after singular times. With Alec Payne, we establish an intersection principle comparing two intersecting flows and prove that level set flows satisfy this principle in the absence of non-uniqueness. |
| Quantum Topology and Field Theory | Twistorial constructions of higher genus integrability |
4:30pm -
KT 801
|
I will present a new method to engineer integrable models in 4d with higher genus spectral parameters. The method has a twistorial origin - by working on a branched covering of twistor space, I show how one can derive deformations of holomorphic BF theory on twistor space which descend to elliptic and hyperelliptic models on R^4 via the Penrose transform. I show how one can bootstrap the Penrose transformed actions using symmetry and integrability to find deformations of self-dual Yang-Mills theory. I will also discuss some novel deformations of a BF type description of Hitchin’s equations. This is based on my recent paper: 2509.12486 |
| Geometric Analysis Learning Seminar | Geometric Analysis Learning Seminar |
10:30am -
KT 801
|
TBA |
| Geometry & Topology | From Riemannian to Lorentzian: Embeddings of Signature-Changing Manifolds |
4:00pm -
KT 203
|
We examine a class of semi-Riemannian manifolds that undergo smooth metric signature change—from Riemannian to Lorentzian—across a hy- persurface with a transverse radical. This class includes physically mo- tivated cosmological models such as the Hartle-Hawking “no-boundary” proposal, in which the universe transitions smoothly from a Euclidean to a Lorentzian phase. We show that these manifolds admit isometric embeddings into higher-dimensional pseudo-Euclidean spaces and, in par- ticular, prove the existence of global isometric embeddings of the canonical model into both Minkowski and Misner spaces. This framework provides a mathematical setting for studying smooth signature change and its role in higher-dimensional and cosmological models. |
| Analysis | Global internal mode dynamics for the 1D quartic Klein-Gordon equation |
4:00pm -
KT 205
|
We study the quartic Klein–Gordon equations with a potential in one space dimension as model problems and establish a global description of internal mode dynamics and radiation damping. It is well-known that internal modes not only decay slowly, but their amplitudes can also lose smallness at large times; combined with the slow dispersive decay in $1$ dimension, this makes the global analysis particularly delicate. Our approach is based on distorted Fourier transforms, normal form transformations, together with a collection of refined dispersive decay and smoothing estimates, which we exploit even at the level of the internal mode equation itself. This a joint work with Gael Diebou, Adilbek Kairzhan and Fabio Pusateri.
|
| Analysis | Concentration and fluctuations of sine-Gordon measure around topological multi-soliton manifold |
4:00pm -
Zoom
|
We study Gibbs measures formally defined by a Sine-Gordon Hamiltonian on long intervals on R, with a restriction on the winding number as a prototype of “topological solitions” in Euclidean field theories. We study concentration and fluctuations of the path around near minimizers of the action.
Joint work with Kihoon Seong and Hao Shen.
|
| Geometry, Symmetry and Physics | Malle's conjecture over function fields |
4:30pm -
KT 801
|
For G a finite group, Malle’s conjecture predicts the asymptotic growth of the number of G extensions of a fixed global field. In joint work with Ishan Levy, we compute the asymptotic growth of the number of Galois G extensions of F_q(t), for q sufficiently large and relatively prime to |G|. In the first part of the talk we will introduce Malle’s conjecture and explain how to reduce the above result to a homological stability result for spaces of G bundles. In the second part of the talk we will explain some of the key ideas in the proof of this homological stability result, which uses tools from higher algebra. |
| Quantum Topology and Field Theory | Cluster Configuration Spaces of Momentum Twistors |
11:00am -
KT 801
|
The formalism of momentum twistors realises the kinematic space of 4-d planar N=4 SYM amplitudes as a configuration space of lines in P^3. All massless kinematics corresponds to consecutive lines intersecting which in turn is interpreted as a configuration of points in P^3, while massive kinematics corresponds to generic configurations of lines. I’ll give an overview of some current work in progress which aims to understand and relate cluster structures on each of these configuration spaces with an eye towards computing amplitudes using the symbol bootstrap. A key idea is to use “partial abelianiziation” of framed PGL_4 local systems on a surface to produce GL_2 local systems on a two fold spectral cover of the surface |
| Learning seminar on Matroids and Algebraic Cycles | Learning seminar on Matroids and Algebraic Cycles |
2:15pm -
KT 801
|
TBA |
| Learning seminar on Groups, Geometry and Dynamics | Learning seminar on Groups Geometry and Dynamics |
4:00pm -
KT 801
|
TBA |