|
This article is cited in 1 scientific paper (total in 1 paper)
Mathematical logic, Algebra and Number Theory
Contribution of Jonas Kubilius to the metric theory of diophantine approximation of dependent variables
V. V. Beresnevicha, V. I. Bernikb, F. Götzec, E. V. Zasimovichb, N. I. Kaloshab a James College, University of York, Campus West, YO10 5DD, York, United Kingdom
b Institute of Mathematics, National Academy of Sciences of Belarus,
11 Surhanava Street, Minsk 220072, Belarus
c Bielefeld University, 25 Universitätsstraße, Bielefeld D-33615, Germany
Abstract:
The article is devoted to the latest results in metric theory of Diophantine approximation. One of the first major result
in area of number theory was a theorem by academician Jonas Kubilius. This paper is dedicated to centenary of his birth.
Over the last 70 years, the area of Diophantine approximation yielded a number of significant results by great mathematicians, including Fields prize winners Alan Baker and Grigori Margulis. In 1964 academician of the Academy of Sciences
of BSSR Vladimir Sprindžuk, who was a pupil of academician J. Kubilius, solved the well-known Mahler’s conjecture on
the measure of the set of S-numbers under Mahler’s classification, thus becoming the founder of the Belarusian academic
school of number theory in 1962.
Keywords:
J. Kubilius; Diophantine approximation; Mahler’s conjecture; metric number theory; transcendence and algebraic numbers.
Received: 14.09.2021 Revised: 21.10.2021 Accepted: 09.11.2021
Citation:
V. V. Beresnevich, V. I. Bernik, F. Götze, E. V. Zasimovich, N. I. Kalosha, “Contribution of Jonas Kubilius to the metric theory of diophantine approximation of dependent variables”, Journal of the Belarusian State University. Mathematics and Informatics, 3 (2021), 34–50
Linking options:
https://www.mathnet.ru/eng/bgumi15 https://www.mathnet.ru/eng/bgumi/v3/p34
|
Statistics & downloads: |
Abstract page: | 144 | Full-text PDF : | 42 | References: | 37 |
|