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Ivan Fesenko
A P-Adic Regulator Map and Finiteness Results for Arithmetic Schemes
Arithmetic Deformation Theory Via Arithmetic Fundamental Groups and Nonarchimedean Theta-Functions, Notes on the Work of Shinichi Mochizuki
Alexey Zykin Professor at the University of French Polynesia
Theoretic Timeline Converging on Motivic Cohomology, Then Briefly Discuss Algebraic 퐾-Theory and Its More Concrete Cousin Milnor 퐾-Theory
Mean-Periodicity and Zeta Functions Tome 62, No 5 (2012), P
Adelic Approach to the Zeta Function of Arithmetic Schemes in Dimension Two
Arxiv:2004.13108V2 [Math.NT] 29 Apr 2020 N“Nta Ht Aabitfo H Edo Oui,[O1a Corollary 5.0.1
The Impenetrable Proof
Titans of Mathematics Clash Over Epic Proof of ABC Conjecture
Global Journal of Advanced Engineering Technologies and Sciences
A P-Adic Regulator Map and Finiteness Results for Arithmetic Schemes
A P-ADIC REGULATOR MAP and FINITENESS RESULTS for ARITHMETIC SCHEMES 1
2015 Annual Report
Analysis on Arithmetic Schemes. II
Class Field Theory, Its Three Main Generalisations, and Applications
RIMS-1933 Explicit Estimates in Inter-Universal Teichmüller Theory
Prizes and Awards
About Certain Aspects of the Study and Dissemination of Shinichi Mochizuki’S Iut Theory
Top View
Oliver, Thomas David (2014) Higher Dimensional Adeles, Mean