Add to ORKGI will present in detail a new twist in the subject of arithmetic algebraization theorems. It comes out of a joint work in progress with Frank Calegari and Yunqing Tang on irrational periods, and bears also a relation to a variation by Zudilin around the classical Polya-Bertrandias determinantal criterion for the rationality of a formal function on the projective line. Time permitting, I will sketch an application to an irrationality proof of the 2-adic avatar of $\zeta(5)$.Non UBCUnreviewedAuthor affiliation: University of TorontoResearche
We show how to apply the group method introduced by G. Rhin and the author to the arithmetical study...
We deduce the transcendence of the Iwasawa power series from Borel's conjecture, namely, the no...
The first part of this thesis is dedicated to irrationality of values of polylogarithms. First, we e...
I will present in detail a new twist in the subject of arithmetic algebraization theorems. It comes ...
We give an overview of our formalizations in the proof assistant Isabelle/HOL of certain irrationali...
A right of passage to theoretical mathematics is often a proof of the irrationality of√ 2, or at lea...
Holonomic techniques have deep roots going back to Wallis, Euler, and Gauss, and have evolved in mod...
We give an overview of our formalizations in the proof assistant Isabelle/HOL of certain irrationali...
The knowledge on irrationality of p-adic zeta values has recently progressed. The irrationality of z...
A simple geometric construction on the moduli spaces M0,n of curves of genus 0 with n ordered marked...
AbstractIn 1940, K. Mahler presented a geometric algorithm which, for any P-adic integer ζ, yields a...
This survey presents certain results concerning the diophantine nature of zeta values or multiple ze...
This book contains short notes or articles, as well as studies on several topics of Geometry and Num...
The multiplication by a constant (say, by 2) acts on the set Z/nZ of residues (mod n) as a dynamical...
The paper deals with a generalization of Rivoal's construction, which enables one to construct...
We show how to apply the group method introduced by G. Rhin and the author to the arithmetical study...
We deduce the transcendence of the Iwasawa power series from Borel's conjecture, namely, the no...
The first part of this thesis is dedicated to irrationality of values of polylogarithms. First, we e...
I will present in detail a new twist in the subject of arithmetic algebraization theorems. It comes ...
We give an overview of our formalizations in the proof assistant Isabelle/HOL of certain irrationali...
A right of passage to theoretical mathematics is often a proof of the irrationality of√ 2, or at lea...
Holonomic techniques have deep roots going back to Wallis, Euler, and Gauss, and have evolved in mod...
We give an overview of our formalizations in the proof assistant Isabelle/HOL of certain irrationali...
The knowledge on irrationality of p-adic zeta values has recently progressed. The irrationality of z...
A simple geometric construction on the moduli spaces M0,n of curves of genus 0 with n ordered marked...
AbstractIn 1940, K. Mahler presented a geometric algorithm which, for any P-adic integer ζ, yields a...
This survey presents certain results concerning the diophantine nature of zeta values or multiple ze...
This book contains short notes or articles, as well as studies on several topics of Geometry and Num...
The multiplication by a constant (say, by 2) acts on the set Z/nZ of residues (mod n) as a dynamical...
The paper deals with a generalization of Rivoal's construction, which enables one to construct...
We show how to apply the group method introduced by G. Rhin and the author to the arithmetical study...
We deduce the transcendence of the Iwasawa power series from Borel's conjecture, namely, the no...
The first part of this thesis is dedicated to irrationality of values of polylogarithms. First, we e...