Lucile Devin |

I am now maître de conférences in the Laboratoire de Mathématiques Pures et Appliqué Joseph Liouville.

Before that, I was a post-doctoral fellow at the University of Ottawa (2017-2019), at the CRM in the Université de Montréal (2019-2020) and at Chalmers University of Technology -- Gothenburg University (2020-2021).
I defended my thesis (manuscript), in June 2017 at the Université d'Orsay under the supervision of Florent Jouve.

I am working in the field of analytic number theory. I am mostly interested in prime number races and generalizations of Chebyshev's bias, and in questions on low-lying zeros, or more generally statistics on zeros of L-functions in families.

My CV.

If you want to hear more about me, you can find here information on my recent and future talks.

Analytic Number Theory and Arithmetic Statistics CRM Montreal, August 26-30, 2024. Registration and application for funding are now open

with Alexandre Bailleul, Daniel Keliher and Wanlin Li,

*Exceptional biases in counting primes over function fields*, pdf (pre-print accepted for publication in JLMS).with Daniel Fiorilli and Anders Södergren,

*Extending the unconditional support in an Iwaniec-Luo-Sarnak family*, pdf (pre-print), extended abstract in Oberwolfach Reports.with Chantal David, Jungbae Nam and Jeremy Schlitt,

*Lemke Oliver and Soundararajan bias for consecutive sums of two squares*, 2022, Math. Ann., pdf, codes are on Jungbae Nam's webpage.*Discrepancies in the distribution of Gaussian primes*, pdf (pre-print).with Daniel Fiorilli and Anders Södergren,

*Low-lying zeros in families of holomorphic cusp forms: the weight aspect*, 2022, Q. J. Math, pdf.with Xianchang Meng,

*Chebyshev's bias for products of irreducible polynomials*, 2021, Adv. Math., pdf.*Limiting properties of the distribution of primes in an arbitrarily large number of residue classes*, 2020, Canad. Math. Bull., pdf, Erratum.*Chebyshev's bias for analytic L-functions*, 2020, Math. Proc. Camb. Phil. Soc., pdf.*On the congruence class modulo prime numbers of the number of rational points of a variety*, 2017, IMRN.