Research area
I work on the representation theory of p-adic groups.
My past and present research focus is the so-called "relative local Langlands program", which deals with the problem of distinction and its relation with the local Langlands functoriality.
I am also interested in developping the representation theory of certain finite central covers of p-adic reductive groups, for example, the Kazhdan-Patterson covering groups of GLn.
Publications and preprints
Simple type theory for metaplectic covers of GL(r) over a non-archimedean local field, submitted.
Local metaplectic correspondence and applications, Math. Z., Volume 305, N.43, 2023.
Classification of irreducible representations of metaplectic covers of the general linear group over a non-archimedean local field, joint with Eyal Kaplan and Erez Lapid, Represent. Theory., N. 27, 2023.
Supercuspidal representations of GLn(F) distinguished by an orthogonal involution, J. Number Theory, Volume 241, 2022.
Supercuspidal representations of GLn(F) distinguished by a unitary involution, Bull. Soc. Math. France, Tome 150, Fascicule 2, 2022.
Ph.D. Thesis
Représentations supercuspidales de GL(n) sur un corps local non archimédien : distinction par un sous-groupe unitaire ou orthogonal, changement de base et induction automorphe. Defence on 13/07/2021 at Université Paris Saclay (UVSQ)