Junior Number Theory Days

Ames 234

08:40     Breakfast in Krieger 413.09:10     Souparna Purohit (Penn): Distribution of the successive minima of the Petersson norm on cusp forms.09:55     Coffee break.10:15     Ruofan Jiang (Wisconsin): Mod p analogue of Mumford–Tate and André–Oort conjectures for GSpin Shimura varieties.11:10     Sun Woo Park (Wisconsin): On the prime Selmer […]

Analysis seminar: Shaoming Guo (Wisconsin)

Krieger 411

Title: Oscillatory integrals on manifolds and related Kakeya and Nikodym problems. Abstract: This talk is about oscillatory integrals on manifolds and their connections to  Kakeya and Nikodym problems on manifolds. There are two types of manifolds that are particularly interesting: manifolds of constant sectional curvature and manifolds satisfying Sogge's chaotic curvature conditions. I will discuss these two […]

Condensed Seminar: Tim Campion (JHU)

Krieger 413

Title: Light condensed setsAbstract: This talk will introduce us to the light condensed setting, the new way of dealing with set-theoretic technicalities in the condensed setup. Particular emphasis will be on the changes, differences, and simplifications compared to the "old" approach, which we discussed last semester.

Algebraic Geometry Seminar: Dori Bejleri (University of Maryland)

Hodson 216

Title: A moduli-theoretic approach to heights on stacks.Abstract: A theory of heights of rational points on stacks was recently introduced by Ellenberg, Satriano and Zureick-Brown as a tool to unify and generalize various results and conjectures about counting problems over global fields. In this talk I will present a moduli theoretic approach to heights on stacks over […]

Number Theory Seminar: Peter Humphries (University of Virginia)

Maryland 201

Title: Restricted Arithmetic Quantum Unique ErgodicityAbstract: The quantum unique ergodicity conjecture of Rudnick and Sarnak concerns the mass equidistribution in the large eigenvalue limit of Laplacian eigenfunctions on negatively curved manifolds. This conjecture has been resolved by Lindenstrauss when this manifold is the modular surface assuming these eigenfunctions are additionally Hecke eigenfunctions, namely Hecke-Maass cusp forms. I […]

Special Number Theory Seminar: Minhyong Kim (International Centre for Mathematical Sciences, Edinburgh)

Krieger 413

Title: Arithmetic Quantum Field Theory? Abstract: Mathematical structures suggested by quantum field theory have revolutionised important areas of algebraic geometry, differential geometry, as well as topology in the last three decades. This talk will introduce a few of the recent ideas for applying structures inspired by physics to arithmetic geometry.

Analysis seminar: Brian Street (Wisconsin)

Krieger 302

Title: Maximal Subellipticity Abstract: The theory of elliptic PDE stands apart from many other areas of PDE because sharp results are known for very general linear and fully nonlinear elliptic PDE.  Many of the classical techniques from harmonic analysis were first developed to prove these sharp results; and the study of elliptic PDE leans heavily on […]

Condensed Seminar: Toan Pham (JHU)

Krieger 413

Title: Solid modules Abstract: For this talk I would like to define and study solid abelian groups, whose construction is motivated in topology/analysis, by the desire to single out (metrizable) topological vector spaces that are complete.

Algebraic Geometry Seminar: Elden Elmanto (University of Toronto)

Hodson 216

Title: The Quillen-Lichtenbaum dimension of an algebraic variety and the integral Hodge conjecture.Abstract: I will explain a numerical invariant of complex varieties born out of the difference between algebraic and topological K-theory. In some cases, it is a birational invariant which is weaker than some known ones coming from unramified cohomology. However, it is also a derived […]

Number Theory Seminar: Christian Klevdal (UCSD)

Maryland 201

Title: Compatibility of canonical ell-adic local systems on Shimura varieties Abstract: In his 1979 Corvallis paper, Deligne uses a modular interpretation to construct canonical models of Shimura varieties of Hodge type, and suggested a dream that all Shimura varieties with rational weight should be moduli spaces of motives over number fields. Outside of the abelian […]