N. V. Budarina, V. I. Bernik, F. Götze, “Effective estimations of the measure of the sets of real numbers in which integer polynomials take small value”, Dal'nevost. Mat. Zh., 2015, Volume 15, Number 1,Pages <nobr>21

Effective estimations of the measure of the sets of real numbers in which integer polynomials take small value

N. V. Budarina^a, V. I. Bernik^b, F. Götze^c

^a Institute for Applied Mathematics, Khabarovsk Division, Far-Eastern Branch of the Russian Academy of Sciences
^b Institute of Mathematics of the National Academy of Sciences of Belarus
^c Bielefeld University, Department of Mathematics

Abstract: In this paper we obtain the effective estimates in the terms of $n$ and $Q$ for the measure of the sets of real numbers with the given approximation property by algebraic numbers of degree $n$ and height bounded by $Q\in\mathbb{N}$.

Key words: integer polynomials, Lebesgue measure, approximation by algebraic numbers.

UDC: 511.42

MSC: Primary 11J83; Secondary 11K60, 11J68

Received: 23.02.2015