Fall 2022 analysis seminar: Difference between revisions
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|Franky Li | |Franky Li | ||
|UW Madison | |UW Madison | ||
| | |[[#Jianhui Li | Affine restriction estimates for surfaces in R^3 via decoupling]] | ||
|Analysis group | |Analysis group | ||
|- | |- | ||
|09.20 | |09.20 (Joint with PDE and Geometric Analysis seminar) | ||
| Andrej Zlatoš | | Andrej Zlatoš | ||
| UCSD | | UCSD | ||
|[[# | |[[#Andrej Zlatoš | Homogenization in front propagation models ]] | ||
| Hung Tran | | Hung Tran | ||
|- | |||
|09.23 Friday, Colloquium | |||
| Pablo Shmerkin | |||
|UBC | |||
|[[#Pablo Shmerkin | Incidences and line counting: from the discrete to the fractal setting]] | |||
| Shaoming Guo and Andreas Seeger | |||
|- | |- | ||
|09.23-09.25 | |09.23-09.25 | ||
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| Michael Magee | | Michael Magee | ||
| Durham | | Durham | ||
|[[# | |[[#Michael Magee | The maximal spectral gap of a hyperbolic surface]] | ||
| Simon Marshall | | Simon Marshall | ||
|- | |- | ||
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| Philip Gressman | | Philip Gressman | ||
| UPenn | | UPenn | ||
| | |Sublevel Set Estimates in Higher Dimensions: Symmetry and Uniformity | ||
| Shaoming Guo | | Shaoming Guo | ||
|- | |- | ||
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| Detlef Müller | | Detlef Müller | ||
| CAU Kiel | | CAU Kiel | ||
|[[# | |[[#Detlef Müller | Maximal averages along hypersurfaces: a geometric conjecture and further progress for 2-surfaces ]] | ||
| Betsy Stovall and Andreas Seeger | | Betsy Stovall and Andreas Seeger | ||
|- | |- | ||
|10.14 (1: | |10.14 (1:20 PM Friday, 901 Van Vleck. Joint with Geometry & Topology Seminar) | ||
| Min Ru | | Min Ru | ||
| U of Houston | | U of Houston | ||
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| Milivoje Lukic | | Milivoje Lukic | ||
| Rice | | Rice | ||
| | |An approach to universality using Weyl m-functions | ||
| Sergey Denisov | | Sergey Denisov | ||
|- | |- | ||
Line 100: | Line 106: | ||
| Ziming Shi | | Ziming Shi | ||
| Rutgers | | Rutgers | ||
|[[# | |[[#Ziming Shi | Sobolev Differentiability Properties of the Modulus of Real Analytic Functions ]] | ||
| Xianghong Gong | | Xianghong Gong | ||
|- | |||
|11.04 (Friday, 1:20-2:10, in room tbd) | |||
|Sarah Tammen | |||
|MIT | |||
|Incidence Estimates for Slabs | |||
|Betsy Stovall | |||
|- | |- | ||
|11.08 | |11.08 | ||
| Robert Fraser | | Robert Fraser | ||
| Wichita State University | | Wichita State University | ||
|[[# | |[[#Robert Fraser | Explicit Salem Sets in $\mathbb{R}^n$]] | ||
| Andreas Seeger | | Andreas Seeger | ||
|- | |- | ||
Line 112: | Line 124: | ||
| Brian Cook | | Brian Cook | ||
| Virginia Tech | | Virginia Tech | ||
|[[# | |[[#Brian Cook | Spherical multiple recurrence]] | ||
| Brian Street | | Brian Street | ||
|- | |- | ||
Line 122: | Line 134: | ||
|- | |- | ||
|11.29 | |11.29 | ||
| | | Jaume de Dios Pont | ||
| | | UCLA | ||
|[[# | |[[Fall 2022 analysis seminar#Jaume de Dios Pont|Uniform boundedness in operators parametrized by polynomial curves]] | ||
| Betsy Stovall | | Betsy Stovall | ||
|- | |||
|12.02 | |||
|Donggeun Ryou | |||
|Rochester | |||
|A variant of the Lambda_p set in Orlicz spaces | |||
|Shaoming Guo | |||
|- | |- | ||
|12.06 | |12.06 | ||
| Shengwen Gan | | Shengwen Gan | ||
| MIT | | MIT | ||
|[[# | |[[#Shengwen Guo | The restricted projection to planes in R^3 ]] | ||
| Shaoming Guo and Andreas Seeger | | Shaoming Guo and Andreas Seeger | ||
|- | |- | ||
|12.13 | |12.13 (postponed) | ||
|Óscar Domínguez | |Óscar Domínguez | ||
|Universidad Complutense Madrid and University of Lyons | |Universidad Complutense Madrid and University of Lyons | ||
|[[# | |[[#Óscar Domínguez | Yudovich theory revisited ]] | ||
|Andreas Seeger and Brian Street | |Andreas Seeger and Brian Street | ||
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[[Spring 2023 Analysis Seminar]] | |||
=Abstracts= | =Abstracts= | ||
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Abstract: The circle method is an analytic proof strategy, typically used in number theory when one wants to estimate the number of integer lattice points in some interesting set. Traditionally the first step is to evaluate the innocent integral $ \int_0^1 e^{2 \pi i t n} dt $ to give 1 if $ n = 0 $ and 0 if $ n $ is any other integer. Since Heath-Brown’s delta-method in the 90s this simplest step has been embellished with carefully constructed partitions of unity. In this informal discussion I will interpret these as different versions of the circle method and suggest how to understand their relative advantages. | Abstract: The circle method is an analytic proof strategy, typically used in number theory when one wants to estimate the number of integer lattice points in some interesting set. Traditionally the first step is to evaluate the innocent integral $ \int_0^1 e^{2 \pi i t n} dt $ to give 1 if $ n = 0 $ and 0 if $ n $ is any other integer. Since Heath-Brown’s delta-method in the 90s this simplest step has been embellished with carefully constructed partitions of unity. In this informal discussion I will interpret these as different versions of the circle method and suggest how to understand their relative advantages. | ||
===Andrej Zlatos=== | |||
Title: Homogenization in front propagation models | |||
Abstract: Homogenization is a general principle that the dynamics of physical processes occurring in periodic or random environments often become effectively homogeneous in the long-time-large-scale limit. I will presents results showing that homogenization occurs for reaction-diffusion equations with both time-periodic-spatially-random and space-time-random KPP reactions and coefficients. These results rely on two crucial new tools: virtual linearity of KPP reaction-diffusion dynamics and a non-autonomous versions of Kingman’s subadditive ergodic theorem. | |||
===Zane Li=== | ===Zane Li=== | ||
Line 163: | Line 219: | ||
Abstract: There are two proofs of Vinogradov's Mean Value Theorem (VMVT), the harmonic analysis decoupling proof by Bourgain, Demeter, and Guth from 2015 and the number theoretic efficient congruencing proof by Wooley from 2017. While there has been recent work illustrating the relation between these two methods, VMVT has been around since 1935. It is then natural to ask: What does old partial progress on VMVT look like in harmonic analysis language? How similar or different does it look from current decoupling proofs? We talk about a refinement of a 1973 argument of Karatsuba that showed partial progress towards VMVT and interpret this in decoupling language. This yields an argument that only uses rather simple geometry of the moment curve. This is joint work with Brian Cook, Kevin Hughes, Olivier Robert, Akshat Mudgal, and Po-Lam Yung. | Abstract: There are two proofs of Vinogradov's Mean Value Theorem (VMVT), the harmonic analysis decoupling proof by Bourgain, Demeter, and Guth from 2015 and the number theoretic efficient congruencing proof by Wooley from 2017. While there has been recent work illustrating the relation between these two methods, VMVT has been around since 1935. It is then natural to ask: What does old partial progress on VMVT look like in harmonic analysis language? How similar or different does it look from current decoupling proofs? We talk about a refinement of a 1973 argument of Karatsuba that showed partial progress towards VMVT and interpret this in decoupling language. This yields an argument that only uses rather simple geometry of the moment curve. This is joint work with Brian Cook, Kevin Hughes, Olivier Robert, Akshat Mudgal, and Po-Lam Yung. | ||
===Jianhui Li=== | |||
Title: Affine restriction estimates for surfaces in \mathbb{R}^3 via decoupling | |||
Abstract: We will discuss some L^2 restriction estimates for smooth compact surfaces in \mathbb{R}^3 with weights that respect affine transformations. The key ingredient is a decoupling inequality. The results are also uniform for polynomial surfaces of bounded degrees and coefficients. Part of the work is joint with Tongou Yang. | |||
===Pablo Shmerkin=== | |||
Title: Incidences and line counting: from the discrete to the fractal setting | |||
Abstract: How many lines are spanned by a set of planar points?. If the points are collinear, then the answer is clearly "one". If they are not collinear, however, several different answers exist when sets are finite and "how many" is measured by cardinality. I will discuss a bit of the history of this problem and present a recent extension to the continuum setting, obtained in collaboration with T. Orponen and H. Wang. No specialized background will be assumed. | |||
=== Michael Magee=== | |||
Title: The maximal spectral gap of a hyperbolic surface | |||
Abstract: A hyperbolic surface is a surface with metric of constant curvature -1. The spectral gap between the first two eigenvalues of the Laplacian on a closed hyperbolic surface contains a good deal of information about the surface, including its connectivity, dynamical properties of its geodesic flow, and error terms in geodesic counting problems. For arithmetic hyperbolic surfaces the spectral gap is also the subject of one of the biggest open problems in automorphic forms: Selberg's eigenvalue conjecture. | |||
A conjecture of Buser from the 1980s stated that there exists a sequence of closed hyperbolic surfaces with genera tending to infinity and spectral gap tending to 1/4. (The value 1/4 here is the asymptotically optimal one.) We proved that such a sequence does exist. I'll discuss the very interesting background of this problem in detail as well as some ideas of the proof. | |||
This is joint work with Will Hide. | |||
=== Philip Gressman=== | |||
Title: Sublevel Set Estimates in Higher Dimensions: Symmetry and Uniformity | |||
Abstract: Using even simple derivative bounds, it is possible to understand the behavior of smooth functions of a single real variable in very precise ways. In contrast, when one moves to dimensions 2 and higher, current best approaches fail to yield the same kind of sharp, uniform inequalities that are relatively easy to obtain in 1D. I will discuss a number of related problems which attempt to illuminate some of the reasons for this discrepancy and to formulate new ways of working in higher dimensions to recover some of the robustness that is available in 1D. Of particular interest will be sublevel sets and uniform estimates for integrals of the sort found in the theory of critical integrability exponents. One main result will show how machinery developed for the study of affine Hausdorff measure can be used to build nonlinear differential operators whose nonvanishing implies uniform sublevel set estimates and bounds for related integrals. | |||
===Detlef Müller=== | |||
Tirlw: Maximal averages along hypersurfaces: a ``geometric conjecture'' and further progress for 2-surfaces. | |||
Link to Abstract: [https://people.math.wisc.edu/~seeger/detlefm-9-2022-abstract.pdf] | |||
===Min Ru=== | |||
Title: The K-stability and Nevanlinna/Diophantine theory | |||
Abstract: In the recent paper with P. Vojta, we introduced the so-called beta-constant, and used it to extend the Cartan's Second Main Theorem in Nevanlinna theory and Schmidt's subspace theorem in Diophantine approximation. It turns out the beta-constant is also used in the algebro-geometric stability criterion in the Fano's case. In this talk, I'll describe and explore the somewhat mysterious connection. The talk is based on the recent joint paper with Yan He entitled "The stability threshold and Diophantine approximation", Proc. AMS, 2022. | |||
===Madelyne M. Brown=== | ===Madelyne M. Brown=== | ||
Line 170: | Line 265: | ||
Abstract: We will discuss the growth of Laplace eigenfunctions on a compact manifold when restricted to a submanifold. We analyze the behavior of the restricted eigenfunctions by studying their Fourier coefficients with respect to an arbitrary orthonormal basis for the submanifold. We give an explicit bound on these coefficients depending on how the defect measures for the two collections of functions, the eigenfunctions and the basis, relate. | Abstract: We will discuss the growth of Laplace eigenfunctions on a compact manifold when restricted to a submanifold. We analyze the behavior of the restricted eigenfunctions by studying their Fourier coefficients with respect to an arbitrary orthonormal basis for the submanifold. We give an explicit bound on these coefficients depending on how the defect measures for the two collections of functions, the eigenfunctions and the basis, relate. | ||
===Milivoje Lukic=== | |||
Title: An approach to universality using Weyl m-functions | |||
Abstract: | |||
I will describe an approach to universality limits for orthogonal polynomials on the real line which is completely local and uses only the boundary behavior of the Weyl $m$-function at the point. We show that bulk universality of the Christoffel--Darboux kernel holds for any point where the imaginary part of the $m$-function has a positive finite nontangential limit. This approach is based on studying a matrix version of the Christoffel--Darboux kernel and the realization that bulk universality for this kernel at a point is equivalent to the fact that the corresponding $m$-function has normal limits at the same point. Our approach automatically applies to other self-adjoint systems with $2\times 2$ transfer matrices such as continuum Schr\"odinger and Dirac operators. We also obtain analogous results for orthogonal polynomials on the unit circle. This is joint work with Benjamin Eichinger and Brian Simanek. | |||
===Ziming Shi=== | |||
Title: Sobolev Differentiability Properties of the Logarithmic Modulus of Real Analytic Functions | |||
<nowiki>Abstract: Let $f$ be the germ of a real analytic function at the origin in $\mathbb{R}^n $ for $n \geq 2$, and suppose the codimension of the zero set of $f$ at $\mathbf{0}$ is at least $2$. We show that $\log |f|$ is $W^{1,1}_{\operatorname{loc}}$ near $\mathbf{0}$. In particular, this implies the differential inequality $|\nabla f |\leq V |f|$ holds with $V \in L^1_{\operatorname{loc}}$. As an application, we derive an inequality relating the {\L}ojasiewicz exponent and the singularity exponent for such functions. | |||
This is joint work with Ruixiang Zhang.</nowiki> | |||
===Sarah Tammen=== | |||
Title: Incidence Estimates for Slabs | |||
Abstract: We discuss incidence estimates for neighborhoods of hyperplanes in R^n, after the work of Guth, Solomon, and Wang, who proved an analogue of the Szemerédi-Trotter theorem to estimate incidences of tubes. We use induction on scales and the high-low method of Vinh, along with new geometric insights. | |||
===Robert Fraser=== | |||
Title: Explicit Salem Sets in <math>\mathbb{R}^n</math> | |||
Link to Abstract: [https://people.math.wisc.edu/~seeger/rfraser22-Abstract.pdf] | |||
===Brian Cook=== | |||
Title: Spherical multiple recurrence | |||
Abstract: We will look at the question of pointwise convergence for a family of ergodic averages over the lattice points on spheres in dimension five and higher, and discuss aspects of extending these types of results to multilinear averages for more general algebraic surfaces. | |||
===Jaume de Dios Pont=== | |||
Title: Uniform boundedness in operators parametrized by polynomial curves | |||
Abstract: Multiple results in harmonic analysis involving integrals of functions over curves (such as restriction theorems, convolution estimates, maximal function estimates or decoupling estimates) depend strongly on the non-vanishing of the torsion of the associated curve. Over the past years there has been considerable interest in extending these results to a degenerate case where the torsion vanishes at a finite number of points by using the affine arc-length as an alternative integration measure. As a model case, multiple results have been proven in which the coordinate functions of the curve are polynomials. In this case one expects the bounds of the operators to depend only on the degree of the polynomial. In this talk I will introduce and motivate the concept of affine arclength measure, provide new decomposition theorems for polynomial curves over characteristic zero local fields, and provide some applications to uniformity results in harmonic analysis. | |||
===Donggeun Ryou=== | |||
Title: A variant of the lambda p set in Orlicz spaces | |||
Abstract: When $p>2$, let $S$ be a set of integers and consider trigonometric polynomials whose Fourier coefficients are supported on S. For various sets S, the range of $p$ has been studied where $L^p$ norms of trigonometric polynomials are bounded by their $L^2$ norms. However, in the opposite direction, we can fix p and think of a set S which satisfies the inequality $\|f\|_p \leq C \|f\|_2$ for some constant C. This set S is called a $\Lambda(p)$-set. In this talk, we will introduce $\Lambda(\Phi)$-sets which are defined in terms of Orlicz norms. And we will discuss some results about $\Lambda(\Phi)$-sets which extends known results about $\Lambda(p)$-sets. | |||
===Shengwen Gan=== | |||
Abstract | Title: The restricted projection to planes in R^3 | ||
Abstract: In this talk, I will discuss a conjecture made by Fässler and Orponen on the restricted | |||
projection to planes in R^3. I will begin with the proof of Falconer-type exceptional set estimate in R^2, and then introduce the decoupling inequality and high-low method to prove the conjecture. | |||
===Óscar Domínguez=== | |||
Title: Yudovich theory revisited | |||
Abstract: The celebrated Yudovich methodology establishes well-posedness of 2D Euler equations with (essentially) bounded vorticities. The goal of this talk is to show how modern interpolation techniques can be applied to improve Yudovich theory. It is joint work with Mario Milman. | |||
[https://wiki.math.wisc.edu/index.php/Spring_2023_Analysis_Seminar Link to the analysis seminar in spring 2023] | |||
[https://www.math.wisc.edu/wiki/index.php/Previous_Analysis_seminars Links to previous analysis seminars] | [https://www.math.wisc.edu/wiki/index.php/Previous_Analysis_seminars Links to previous analysis seminars] |
Latest revision as of 19:32, 26 January 2023
The 2022-2023 Analysis Seminar will be organized by Shaoming Guo. The regular time and place for the Seminar will be Tuesdays at 4:00 p.m. in Van Vleck B139 (in some cases the seminar may be scheduled at different time to accommodate speakers). If you would like to subscribe to the Analysis seminar list, send a blank email to analysis+join (at) g-groups (dot) wisc (dot) edu. If you are from an institution different than UW-Madison, please send as well as an additional email to Shaoming. If you'd like to suggest speakers for the spring semester please contact Shaoming.
All talks will be in-person unless otherwise specified.
Analysis Seminar Schedule
date | speaker | institution | title | host(s) |
---|---|---|---|---|
08.23 | Gustavo Garrigós | University of Murcia | Approximation by N-term trigonometric polynomials and greedy algorithms | Andreas Seeger |
08.30 | Simon Myerson | Warwick | Forms of the Circle Method | Shaoming Guo |
09.13
(first week of semester) |
Zane Li | UW Madison | A decoupling interpretation of an old argument for Vinogradov's Mean Value Theorem | Analysis group |
09.16
(Friday, 1:20-2:10, Room B139) |
Franky Li | UW Madison | Affine restriction estimates for surfaces in R^3 via decoupling | Analysis group |
09.20 (Joint with PDE and Geometric Analysis seminar) | Andrej Zlatoš | UCSD | Homogenization in front propagation models | Hung Tran |
09.23 Friday, Colloquium | Pablo Shmerkin | UBC | Incidences and line counting: from the discrete to the fractal setting | Shaoming Guo and Andreas Seeger |
09.23-09.25 | RTG workshop in Harmonic Analysis | Shaoming Guo and Andreas Seeger | ||
09.27
(online, special time, 3-4pm) |
Michael Magee | Durham | The maximal spectral gap of a hyperbolic surface | Simon Marshall |
10.04 | Philip Gressman | UPenn | Sublevel Set Estimates in Higher Dimensions: Symmetry and Uniformity | Shaoming Guo |
10.11 | Detlef Müller | CAU Kiel | Maximal averages along hypersurfaces: a geometric conjecture and further progress for 2-surfaces | Betsy Stovall and Andreas Seeger |
10.14 (1:20 PM Friday, 901 Van Vleck. Joint with Geometry & Topology Seminar) | Min Ru | U of Houston | The K-stability and Nevanlinna/Diophantine theory | Xianghong Gong |
10.18 | Madelyne M. Brown | UNC | Fourier coefficients of restricted eigenfunctions | Betsy Stovall |
10.24 (Monday, B135) | Milivoje Lukic | Rice | An approach to universality using Weyl m-functions | Sergey Denisov |
11.01 | Ziming Shi | Rutgers | Sobolev Differentiability Properties of the Modulus of Real Analytic Functions | Xianghong Gong |
11.04 (Friday, 1:20-2:10, in room tbd) | Sarah Tammen | MIT | Incidence Estimates for Slabs | Betsy Stovall |
11.08 | Robert Fraser | Wichita State University | Explicit Salem Sets in $\mathbb{R}^n$ | Andreas Seeger |
11.15 | Brian Cook | Virginia Tech | Spherical multiple recurrence | Brian Street |
11.22 | Thanksgiving | |||
11.29 | Jaume de Dios Pont | UCLA | Uniform boundedness in operators parametrized by polynomial curves | Betsy Stovall |
12.02 | Donggeun Ryou | Rochester | A variant of the Lambda_p set in Orlicz spaces | Shaoming Guo |
12.06 | Shengwen Gan | MIT | The restricted projection to planes in R^3 | Shaoming Guo and Andreas Seeger |
12.13 (postponed) | Óscar Domínguez | Universidad Complutense Madrid and University of Lyons | Yudovich theory revisited | Andreas Seeger and Brian Street |
Abstracts
Gustavo Garrigós
Title: Approximation by N-term trigonometric polynomials and greedy algorithms
Link to Abstract: [1]
Simon Myerson
Title: Forms of the circle method
Abstract: The circle method is an analytic proof strategy, typically used in number theory when one wants to estimate the number of integer lattice points in some interesting set. Traditionally the first step is to evaluate the innocent integral $ \int_0^1 e^{2 \pi i t n} dt $ to give 1 if $ n = 0 $ and 0 if $ n $ is any other integer. Since Heath-Brown’s delta-method in the 90s this simplest step has been embellished with carefully constructed partitions of unity. In this informal discussion I will interpret these as different versions of the circle method and suggest how to understand their relative advantages.
Andrej Zlatos
Title: Homogenization in front propagation models
Abstract: Homogenization is a general principle that the dynamics of physical processes occurring in periodic or random environments often become effectively homogeneous in the long-time-large-scale limit. I will presents results showing that homogenization occurs for reaction-diffusion equations with both time-periodic-spatially-random and space-time-random KPP reactions and coefficients. These results rely on two crucial new tools: virtual linearity of KPP reaction-diffusion dynamics and a non-autonomous versions of Kingman’s subadditive ergodic theorem.
Zane Li
Title: A decoupling interpretation of an old argument for Vinogradov's Mean Value Theorem
Abstract: There are two proofs of Vinogradov's Mean Value Theorem (VMVT), the harmonic analysis decoupling proof by Bourgain, Demeter, and Guth from 2015 and the number theoretic efficient congruencing proof by Wooley from 2017. While there has been recent work illustrating the relation between these two methods, VMVT has been around since 1935. It is then natural to ask: What does old partial progress on VMVT look like in harmonic analysis language? How similar or different does it look from current decoupling proofs? We talk about a refinement of a 1973 argument of Karatsuba that showed partial progress towards VMVT and interpret this in decoupling language. This yields an argument that only uses rather simple geometry of the moment curve. This is joint work with Brian Cook, Kevin Hughes, Olivier Robert, Akshat Mudgal, and Po-Lam Yung.
Jianhui Li
Title: Affine restriction estimates for surfaces in \mathbb{R}^3 via decoupling
Abstract: We will discuss some L^2 restriction estimates for smooth compact surfaces in \mathbb{R}^3 with weights that respect affine transformations. The key ingredient is a decoupling inequality. The results are also uniform for polynomial surfaces of bounded degrees and coefficients. Part of the work is joint with Tongou Yang.
Pablo Shmerkin
Title: Incidences and line counting: from the discrete to the fractal setting
Abstract: How many lines are spanned by a set of planar points?. If the points are collinear, then the answer is clearly "one". If they are not collinear, however, several different answers exist when sets are finite and "how many" is measured by cardinality. I will discuss a bit of the history of this problem and present a recent extension to the continuum setting, obtained in collaboration with T. Orponen and H. Wang. No specialized background will be assumed.
Michael Magee
Title: The maximal spectral gap of a hyperbolic surface
Abstract: A hyperbolic surface is a surface with metric of constant curvature -1. The spectral gap between the first two eigenvalues of the Laplacian on a closed hyperbolic surface contains a good deal of information about the surface, including its connectivity, dynamical properties of its geodesic flow, and error terms in geodesic counting problems. For arithmetic hyperbolic surfaces the spectral gap is also the subject of one of the biggest open problems in automorphic forms: Selberg's eigenvalue conjecture.
A conjecture of Buser from the 1980s stated that there exists a sequence of closed hyperbolic surfaces with genera tending to infinity and spectral gap tending to 1/4. (The value 1/4 here is the asymptotically optimal one.) We proved that such a sequence does exist. I'll discuss the very interesting background of this problem in detail as well as some ideas of the proof.
This is joint work with Will Hide.
Philip Gressman
Title: Sublevel Set Estimates in Higher Dimensions: Symmetry and Uniformity
Abstract: Using even simple derivative bounds, it is possible to understand the behavior of smooth functions of a single real variable in very precise ways. In contrast, when one moves to dimensions 2 and higher, current best approaches fail to yield the same kind of sharp, uniform inequalities that are relatively easy to obtain in 1D. I will discuss a number of related problems which attempt to illuminate some of the reasons for this discrepancy and to formulate new ways of working in higher dimensions to recover some of the robustness that is available in 1D. Of particular interest will be sublevel sets and uniform estimates for integrals of the sort found in the theory of critical integrability exponents. One main result will show how machinery developed for the study of affine Hausdorff measure can be used to build nonlinear differential operators whose nonvanishing implies uniform sublevel set estimates and bounds for related integrals.
Detlef Müller
Tirlw: Maximal averages along hypersurfaces: a ``geometric conjecture and further progress for 2-surfaces.
Link to Abstract: [2]
Min Ru
Title: The K-stability and Nevanlinna/Diophantine theory
Abstract: In the recent paper with P. Vojta, we introduced the so-called beta-constant, and used it to extend the Cartan's Second Main Theorem in Nevanlinna theory and Schmidt's subspace theorem in Diophantine approximation. It turns out the beta-constant is also used in the algebro-geometric stability criterion in the Fano's case. In this talk, I'll describe and explore the somewhat mysterious connection. The talk is based on the recent joint paper with Yan He entitled "The stability threshold and Diophantine approximation", Proc. AMS, 2022.
Madelyne M. Brown
Title: Fourier coefficients of restricted eigenfunctions
Abstract: We will discuss the growth of Laplace eigenfunctions on a compact manifold when restricted to a submanifold. We analyze the behavior of the restricted eigenfunctions by studying their Fourier coefficients with respect to an arbitrary orthonormal basis for the submanifold. We give an explicit bound on these coefficients depending on how the defect measures for the two collections of functions, the eigenfunctions and the basis, relate.
Milivoje Lukic
Title: An approach to universality using Weyl m-functions
Abstract:
I will describe an approach to universality limits for orthogonal polynomials on the real line which is completely local and uses only the boundary behavior of the Weyl $m$-function at the point. We show that bulk universality of the Christoffel--Darboux kernel holds for any point where the imaginary part of the $m$-function has a positive finite nontangential limit. This approach is based on studying a matrix version of the Christoffel--Darboux kernel and the realization that bulk universality for this kernel at a point is equivalent to the fact that the corresponding $m$-function has normal limits at the same point. Our approach automatically applies to other self-adjoint systems with $2\times 2$ transfer matrices such as continuum Schr\"odinger and Dirac operators. We also obtain analogous results for orthogonal polynomials on the unit circle. This is joint work with Benjamin Eichinger and Brian Simanek.
Ziming Shi
Title: Sobolev Differentiability Properties of the Logarithmic Modulus of Real Analytic Functions
Abstract: Let $f$ be the germ of a real analytic function at the origin in $\mathbb{R}^n $ for $n \geq 2$, and suppose the codimension of the zero set of $f$ at $\mathbf{0}$ is at least $2$. We show that $\log |f|$ is $W^{1,1}_{\operatorname{loc}}$ near $\mathbf{0}$. In particular, this implies the differential inequality $|\nabla f |\leq V |f|$ holds with $V \in L^1_{\operatorname{loc}}$. As an application, we derive an inequality relating the {\L}ojasiewicz exponent and the singularity exponent for such functions. This is joint work with Ruixiang Zhang.
Sarah Tammen
Title: Incidence Estimates for Slabs
Abstract: We discuss incidence estimates for neighborhoods of hyperplanes in R^n, after the work of Guth, Solomon, and Wang, who proved an analogue of the Szemerédi-Trotter theorem to estimate incidences of tubes. We use induction on scales and the high-low method of Vinh, along with new geometric insights.
Robert Fraser
Title: Explicit Salem Sets in [math]\displaystyle{ \mathbb{R}^n }[/math]
Link to Abstract: [3]
Brian Cook
Title: Spherical multiple recurrence
Abstract: We will look at the question of pointwise convergence for a family of ergodic averages over the lattice points on spheres in dimension five and higher, and discuss aspects of extending these types of results to multilinear averages for more general algebraic surfaces.
Jaume de Dios Pont
Title: Uniform boundedness in operators parametrized by polynomial curves
Abstract: Multiple results in harmonic analysis involving integrals of functions over curves (such as restriction theorems, convolution estimates, maximal function estimates or decoupling estimates) depend strongly on the non-vanishing of the torsion of the associated curve. Over the past years there has been considerable interest in extending these results to a degenerate case where the torsion vanishes at a finite number of points by using the affine arc-length as an alternative integration measure. As a model case, multiple results have been proven in which the coordinate functions of the curve are polynomials. In this case one expects the bounds of the operators to depend only on the degree of the polynomial. In this talk I will introduce and motivate the concept of affine arclength measure, provide new decomposition theorems for polynomial curves over characteristic zero local fields, and provide some applications to uniformity results in harmonic analysis.
Donggeun Ryou
Title: A variant of the lambda p set in Orlicz spaces
Abstract: When $p>2$, let $S$ be a set of integers and consider trigonometric polynomials whose Fourier coefficients are supported on S. For various sets S, the range of $p$ has been studied where $L^p$ norms of trigonometric polynomials are bounded by their $L^2$ norms. However, in the opposite direction, we can fix p and think of a set S which satisfies the inequality $\|f\|_p \leq C \|f\|_2$ for some constant C. This set S is called a $\Lambda(p)$-set. In this talk, we will introduce $\Lambda(\Phi)$-sets which are defined in terms of Orlicz norms. And we will discuss some results about $\Lambda(\Phi)$-sets which extends known results about $\Lambda(p)$-sets.
Shengwen Gan
Title: The restricted projection to planes in R^3
Abstract: In this talk, I will discuss a conjecture made by Fässler and Orponen on the restricted projection to planes in R^3. I will begin with the proof of Falconer-type exceptional set estimate in R^2, and then introduce the decoupling inequality and high-low method to prove the conjecture.
Óscar Domínguez
Title: Yudovich theory revisited
Abstract: The celebrated Yudovich methodology establishes well-posedness of 2D Euler equations with (essentially) bounded vorticities. The goal of this talk is to show how modern interpolation techniques can be applied to improve Yudovich theory. It is joint work with Mario Milman.
Link to the analysis seminar in spring 2023