Андрей Бузин / Wednesday, May 16, 2018 / Categories: Articles by geography, Russia, Moscow (city of), Unimodality, Retrospective Analysis, Investigations of this type, Investigations of this type, Investigations of this type, II Round Table, Slides and presentations Andrei Buzin "The Evolution of Moscow's Electoral Anomalies" Presentation at the II Round Table of Mathematicians Andrey Buzin "Evolution of Moscow's electoral anomalies" Presentation at the II Round Table of Mathematicians. Print 33068 Tags: RF President 2012RF President 2018 Theoretic depthObservation Documents to download Бузин Эволюция электоральных аномалий Москвы 2018(.pdf, 2.26 MB) - 2234 download(s) Related articles Alexander Shen. II Roundtable of Mathematicians. 2018 Alexander Shen "What mathematical statistics can't say" A triumphant victory over myself Assignment: find the top three most criminal elections of EDG 2019 Alexey Kupriyanov. II Round Table of Mathematicians. 2018 Please login or register to post comments.
In Luhansk, addition was dismissed as a Bandera method. In Luhansk, addition was dismissed as a Bandera method. It can be considered proven that the "results" were determined arbitrarily. EG / Wednesday, May 14, 2014 0 5425 It can be considered proven that the "results" of the referendum, at least in the Luhansk region, were determined arbitrarily by its organizers, without any connection to the actual voting results. Read more
On the fabricated results of the referendum in the Luhansk region On the fabricated results of the referendum in the Luhansk region A mathematician detected falsification using three numerals EG / Wednesday, May 14, 2014 0 4725 When results are fabricated, percentages are first made up, and absolute numbers are then calculated from them. That's how they got caught. Read more
Elections and statistics: the United Russia casus belli (2009-2020) Elections and statistics: the United Russia casus belli (2009-2020) October 22, 2009, December 2011 through April 2012, May 2018, July 2020, September 2020 Alexander Shen / Thursday, January 1, 2009 0 9090 Alexander Shen's classic work, written by him in 2009, and continued for 11 years. Read more