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15 results on '"Gauthier, Mathilde"'

1. Root Number Equidistribution for Self-Dual Automorphic Representations on $GL_N$

Author

Dalal, Rahul and Gerbelli-Gauthier, Mathilde

Subjects
Mathematics - Number Theory, Mathematics - Representation Theory, 11F70, 11F72 (primary) 11F67, 11F80, 22E50 (secondary)
Abstract

Let $F$ be a totally real field. We study the root numbers $\epsilon(1/2, \pi)$ of self-dual cuspidal automorphic representations $\pi$ of $\mathrm{GL}_{2N}/F$ with conductor $\mathfrak n$ and regular integral infinitesimal character $\lambda$. If $\pi$ is orthogonal, then $\epsilon(1/2, \pi)$ is known to be identically one. We show that for symplectic representations, the root numbers $\epsilon(1/2, \pi)$ equidistribute between~$\pm 1$ as $\lambda \to \infty$, provided that there exists a prime dividing $\mathfrak n$ with power $>N$.We also study conjugate self-dual representations with respect to a CM extension $E/F$, where we obtain a similar result under the assumption that $\mathfrak n$ is divisible by a large enough power of a ramified prime and provide evidence that equidistribution does not hold otherwise. In cases where there are known to be associated Galois representations, we deduce root number equidistribution results for the corresponding families of $N$-dimensional Galois representations. The proof generalizes a classical argument for the case of $\mathrm{GL}_2/\mathbb Q$ by using Arthur's trace formula and the endoscopic classification for quasisplit classical groups similarly to a previous work (arxiv:2212.12138). The main new technical difficulty is evaluating endoscopic transfers of the required test functions at central elements., Comment: 81 pages, this version: improved exposition and many typo fixes and minor corrections. Comments are welcome!

Published
2024

2. Cohomology of Fuchsian groups and Fourier interpolation

Author

Gerbelli-Gauthier, Mathilde and Venkatesh, Akshay

Subjects
Mathematics - Number Theory, Mathematics - Functional Analysis, Mathematics - Representation Theory
Abstract

We give a new proof of a Fourier interpolation result first proved by Radchenko-Viazovska, deriving it from a vanishing result of the first cohomology of a Fuchsian group with coefficients in the Weil representation.

Published
2024

3. A Note on Large Sums of Divisor-Bounded Multiplicative Functions

Author

Frechette, Claire, Gerbelli-Gauthier, Mathilde, Hamieh, Alia, and Tanabe, Naomi

Subjects
Mathematics - Number Theory, Primary 11F30, secondary 11F11, 11F12, 11M41
Abstract

Given a multiplicative function $f$, we let $S(x,f)=\sum_{n\leq x}f(n)$ be the associated partial sum. In this note, we show that lower bounds on partial sums of divisor-bounded functions result in lower bounds on the partial sums associated to their products. More precisely, we let $f_j$, $j=1,2$ be such that $|f_j(n)|\leq \tau(n)^\kappa$ for some $\kappa\in\mathbb{N}$, and assume their partial sums satisfy $\left|S(x_j,f_j)\right|\geq \eta x_j (\log x_j)^{2^\kappa-1}$ for some $x_1, x_2\gg 1$ and $\eta>\max_j\{(\log x_j)^{-1/100}\}$. We then show that there exists $x\geq \min\{x_1, x_2\}^{\xi^2}$ such that $\left|S(x,f_1f_2)\right|\geq \xi x (\log x)^{2^{2\kappa}-1}$, where $\xi=C\eta^{1+2^{\kappa+3}}$ for some absolute constant $C>0$., Comment: 16 pages, project begun at Women in Numbers 6

Published
2024

4. The Cohomological Sarnak-Xue Density Hypothesis for $SO_5$

Author

Evra, Shai, Gerbelli-Gauthier, Mathilde, and Gustafsson, Henrik P. A.

Subjects
Mathematics - Number Theory, Mathematics - Representation Theory
Abstract

We prove the cohomological version of the Sarnak-Xue Density Hypothesis for $SO_5$ over a totally real field and for inner forms split at all finite places. The proof relies on recent lines of work in the Langlands program: (i) Arthur's Endoscopic Classification of Representations of classical groups, and (ii) the Generalized Ramanujan-Petersson Theorem, proved for cohomological self-dual cuspidal representations of general linear groups. We give applications for the growth of cohomology of arithmetic manifolds, density-Ramanujan complexes, cutoff phenomena and optimal strong approximation., Comment: 73 pages

Published
2023

5. Large Sums of Fourier Coefficients of Cusp Forms

Author

Frechette, Claire, Gerbelli-Gauthier, Mathilde, Hamieh, Alia, and Tanabe, Naomi

Subjects
Mathematics - Number Theory, 11F30 (Primary) 11F11, 11F12, 11M41 (Secondary)
Abstract

Let $N$ be a fixed positive integer, and let $f\in S_k(N)$ be a primitive cusp form given by the Fourier expansion $f(z)=\sum_{n=1}^{\infty} \lambda_f(n)n^{\frac{k-1}{2}}e(nz)$. We consider the partial sum $S(x,f)=\sum_{n\leq x}\lambda_f(x)$. It is conjectured that $S(x,f)=o(x\log x)$ in the range $x\geq k^{\epsilon}$. Lamzouri proved in arXiv:1703.10582 [math.NT] that this is true under the assumption of the Generalized Riemann Hypothesis (GRH) for $L(s,f)$. In this paper, we prove that this conjecture holds under a weaker assumption than GRH. In particular, we prove that given $\epsilon>(\log k)^{-\frac{1}{8}}$ and $1\leq T\leq (\log k)^{\frac{1}{200}}$, we have $S(x,f)\ll \frac{x\log x}{T}$ in the range $x\geq k^{\epsilon}$ provided that $L(s,f)$ has no more than $\epsilon^2\log k/5000$ zeros in the region $\left\{s\,:\, \Re(s)\geq \frac34, \, |\Im(s)-\phi| \leq \frac14\right\}$ for every real number $\phi$ with $|\phi|\leq T$., Comment: 14 pages

Published
2023

6. Mod $\ell$ gamma factors and a converse theorem for finite general linear groups

Author

Bakeberg, Jacksyn, Gerbelli-Gauthier, Mathilde, Goodson, Heidi, Iyengar, Ashwin, Moss, Gilbert, and Zhang, Robin

Subjects
Mathematics - Number Theory, Mathematics - Representation Theory, 20C33, 20C20, 11L05, 20G40, 11S40
Abstract

For $q$ a power of a prime $p$, we study gamma factors of representations of $GL_n(\mathbb{F}_q)$ over an algebraically closed field $k$ of positive characteristic $\ell \neq p$. We show that the reduction mod $\ell$ of the gamma factor defined in characteristic zero fails to satisfy the analogue of the local converse theorem of Piatetski-Shapiro. To remedy this, we construct gamma factors valued in arbitrary $\mathbb{Z}[1/p, \zeta_p]$-algebras $A$, where $\zeta_p$ is a primitive $p$-th root of unity, for Whittaker-type representations $\rho$ and $\pi$ of $GL_n(\mathbb{F}_q)$ and $GL_m(\mathbb{F}_q)$ over $A$. We let $P(\pi)$ be the projective envelope of $\pi$ and let $R(\pi)$ be its endomorphism ring and define new gamma factors $\widetilde\gamma(\rho \times \pi) = \gamma((\rho\otimes_kR(\pi)) \times P(\pi))$, which take values in the local Artinian $k$-algebra $R(\pi)$. We prove a converse theorem for cuspidal representations using the new gamma factors. When $n=2$ and $m=1$ we construct a different ``new'' gamma factor $\gamma^{\ell}(\rho,\pi)$, which takes values in $k$ and satisfies a converse theorem., Comment: 35 pages. Comments Welcome!

Published
2023

7. Statistics of Cohomological Automorphic Representations on Unitary Groups via the Endoscopic Classification

Author

Dalal, Rahul and Gerbelli-Gauthier, Mathilde

Subjects
Mathematics - Number Theory, Mathematics - Representation Theory, 11F70, 11F72 (primary) 11F75, 22E50 (secondary)
Abstract

Consider the family of automorphic representations on a unitary group with cohomological factor $\pi_0$ at infinity and given split level. We compute statistics of this family as the level goes to infinity. For unramified unitary groups and a large class of $\pi_0$, we use the endoscopic classification of representations to compute the exact leading term for counts of representations and averages of Satake parameters. The bounds on our error terms are similar to previous work by Shin-Templier who studied the case of discrete series at infinity. We also prove new upper bounds for all cohomological representations. This has many corollaries: new exact asymptotics on the growth of cohomology in certain towers of locally symmetric spaces, an averaged Sato-Tate equidistribution law for spectral families with specific non-tempered cohomological components at infinity, and the Sarnak-Xue density hypothesis for cohomological representations at infinity on all unitary groups of rank $\geq 5$., Comment: This version: fixed normalization issue in Sato-Tate section, removed unnecessary claim in lemma 2.4.3, many typo fixes

Published
2022

8. Limit Multiplicity For Unitary Groups and The Stable Trace Formula

Author

Gerbelli-Gauthier, Mathilde

Subjects
Mathematics - Representation Theory, Mathematics - Number Theory
Abstract

We give upper bounds on limit multiplicities of certain non-tempered representations of unitary groups $U(a,b)$. These include some cohomological representations, and we give applications to the growth of cohomology of cocompact arithmetic subgroups of unitary groups. The representations considered are transfers of products of characters and discrete series on endoscopic groups, and the bounds are obtained using Arthur's stabilization of the trace formula and the endoscopic classification of representations due to Mok and Kaletha-Minguez-Shin-White., Comment: To appear in Algebra and Number Theory

Published
2021
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9. Growth of cohomology of arithmetic groups and the stable trace formula: the case of $U(2,1)$

Author

Gerbelli-Gauthier, Mathilde

Subjects
Mathematics - Number Theory, Mathematics - Representation Theory
Abstract

We present a strategy to use the stable trace formula to compute growth in the cohomology of cocompact arithmetic lattices in a reductive group $G$. We then implement it in the case where $G = U(2,1)$, using results of Rogwaski. This recovers a result of Marshall., Comment: 22 pages

Published
2019

10. Dresses and Suits: a shared perception? : A quantitative study of how consumers perceive fashion brand activism depending on their gender.

Author

Teyssier, Maude, Michard, Florine, Gauthier, Mathilde, Teyssier, Maude, Michard, Florine, and Gauthier, Mathilde

Abstract

In contemporary times, the concept of brand activism has emerged among consumers and companies alike, particularly within the fashion industry. Consumers are increasingly seeking brands that demonstrate a commitment to societal and environmental concerns, leading to a rise in brand activism within this sector. The purpose of this research is to investigate and comprehend how consumers perceive fashion brand activism according to their gender. The empirical findings were acquired using a quantitative approach by an Internet-mediated questionnaire. The data were subsequently analysed and compared with existing literature reviews to highlight both similarities and disparities. This thesis demonstrates that while both men and women generally perceive fashion brand activism in similar terms of authenticity and inauthenticity, women tend to have a stronger affinity towards these brands due to shared values. In comparison, men often view them neutrally or negatively, suggesting potential disparities in emotional investment or perceptions of social commitment. Overall, although authenticity is universally considered, gender influences consumer perspectives on activist fashion brands. All conclusions proposed by the authors account for the predominant demographic characteristics of the sample population. Consequently, these generalisations primarily apply to students of French nationality.

Published
2024

13. Burnout

Author

Del Junco, Clara, Gerbelli-Gauthier, Mathilde, Balthaser, Benjamin, Shen, Tif, Tosca, Mika, Potash, Eric, Fuldner, Carl, DuBay, Shane, Leão, Eduardo, Khullar, Gourav, Readman Prud'homme, Camille, Lee, Woo Chan, Rivard, Dominique, Wilhelm, Ella, Linebaugh, Riley, Estevez-Torres, André, and Burnett, Hannah Eisler

Subjects
Travel, Academia, Climate Change
Abstract

A zine about academia, travel, and climate change

Published
2021
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14. Growth of Cohomology of Arithmetic Groups and the Stable Trace Formula

Author

Gerbelli-Gauthier, Mathilde

Subjects
FOS: Mathematics, Mathematics
Abstract

We study growth of Betti numbers in towers of cocompact arithmetic lattices in unitary groups U(a,b). In the middle degree of cohomology, the Betti numbers grow proportionally to the volume of the manifold, but away from the middle degree, the growth is known to be sub-linear in the volume. After rephrasing the problem into representation-theoretic terms, we give upper bounds on the growth of cohomology in small degrees coming from certain families of representations. These upper bounds are achieved in the framework of the endoscopic classification of representations: we use Arthur's stable trace formula to bound the growth in terms of multiplicities of discrete series representations on endoscopic groups.

Published
2020
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