Diophantine approximations with a constant right-hand side of inequalities on short intervals. 1-Reference-Cited by-同舟云学术

Diophantine approximations with a constant right-hand side of inequalities on short intervals. 1

Published:2021-11-08 Issue:5 Volume:65 Page:526-532
ISSN:2524-2431
Container-title:Doklady of the National Academy of Sciences of Belarus
language:
Short-container-title:Dokl. Akad. nauk

Author:

Bernik V. I.¹,Budarina N. V.²,Zasimovich E. V.¹

Affiliation:

1. Institute of Mathematics of the National Academy of Sciences of Belarus

2. Institute of Technology of Dundalk

Abstract

The problem of finding the Lebesgue measure 𝛍 of the set B1 of the coverings of the solutions of the inequality, ⎸Px⎹ <Q−w, w>n , Q ∈ N and Q >1, in integer polynomials P (x) of degree, which doesn’t exceed n and the height H (P) ≤ Q , is one of the main problems in the metric theory of the Diophantine approximation. We have obtained a new bound 𝛍B1 <c(n)Q−w+n, n<w<n+1, that is the most powerful to date. Even an ineffective version of this bound allowed V. G. Sprindzuk to solve Mahler’s famous problem.

Publisher

Publishing House Belorusskaya Nauka

Reference8 articles.

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3. Bernik V. I. The exact order of approximating zero by values of integral polynomials. Acta Arithmetica, 1989, vol. 53, no. 1, pp. 17–28.

4. Beresnevich V. V. On approximation of real numbers by real algebraic numbers. Acta Arithmetica, 1999, vol. 90, no. 2, pp. 97–112. https://doi.org/10.4064/aa-90-2-97-112

5. Bernik V. I., Dodson M. M. Metric Diophantine Approximation on Manifolds. Cambridge, 1999. https://doi.org/10.1017/cbo9780511565991