Post-doctoral fellow at Ben Gurion University of the Negev
e-mail : jarossay@post.bgu.ac.il
Published papers
A bound on the norm of overconvergent p-adic multiple polylogarithms, J. Number Theory, Vol. 205, December 2019, 81-121 arXiv journal video summary
Pro-unipotent harmonic actions and dynamical properties of p-adic cyclotomic multiple zeta values, Alg. Number Th. 14 (2020) 1711-1746 arXiv journal
p-adic multiple L-functions and cyclotomic multiple harmonic values, joint with Hidekazu Furusho , Int. J. Number Theory, Vol 16 n°2 (2020) 361-375, arXiv journal
Depth reductions for associators, J. Number Theory, Vol. 217, December 2020, 163-192 arXiv journal
Submitted papers
M_0,5 : Towards the Chabauty-Kim method in higher dimensions, joint with Ishai Dan-Cohen, arXiv
Adjoint cyclotomic multiple zeta values and cyclotomic multiple harmonic values, arXiv
Non-vanishing of certain cyclotomic multiple harmonic sums and application to the non-vanishing of certain p-adic cyclotomic multiple zeta values, arXiv
Published notes
Une notion de multizêtas finis associée au Frobenius du groupe fondamental de P^1 - {0,1,\infty} - Comptes rendus - Mathématique 353 (2015) pp. 877-882.
Un cadre explicite pour les polylogarithmes multiples p-adiques et les multizêtas p-adiques - Comptes-rendus - Mathématique 353 (2015) pp. 871-876.
Double mélange des multizêtas finis et multizêtas symétrisés - Comptes rendus - Mathématique 352 (2014) pp. 767-771.
Papers in revision (the titles are those of the future revisions)
Pro-unipotent harmonic actions and a computation of p-adic cyclotomic multiple zeta value, arxiv:1501.04893
The adjoint quasi-shuffle equation of p-adic cyclotomic multiple zeta values recovered via the explicit formulas, arxiv:1601.01158
Cyclotomic multiple harmonic values regarded as periods, arxiv:1601.01159
Interpolation of p-adic cyclotomic multiple zeta values, arxiv:1712.09976
Complex cyclotomic multiple zeta values and pro-unipotent harmonic actions, arxiv:1908.01410
On generic double shuffle relations, localized multiple polylogarithms and algebraic functions, arxiv:1908.01410
Expository text
p-adic multiple zeta values and p-adic pro-unipotent harmonic actions : summary of parts I and II, arXiv
A video talk by Seidai Yasuda : link
"Integrality of p-adic multiple zeta values and application to finite multiple zeta values" - Séminaire d'Arithmétique et Géométrie Algébrique Paris-Beijing-Tokyo
He explains his result of integrality of p-adic multiple zeta values, then my proof of his conjecture, starting at 49 minutes, and finally the application to finite multiple zeta values.