Asymptotic diophantine approximation : the multiplicative case. / Widmer, Martin.

In: Ramanujan Journal, Vol. 43, No. 1, 05.2017, p. 83-93.

Research output: Contribution to journalArticlepeer-review





Let αα and ββ be irrational real numbers and 0<ε<1/300<ε<1/30. We prove a precise estimate for the number of positive integers q≤Qq≤Q that satisfy ∥qα∥⋅∥qβ∥<ε∥qα∥⋅∥qβ∥<ε. If we choose εε as a function of Q, we get asymptotics as Q gets large, provided εQεQ grows quickly enough in terms of the (multiplicative) Diophantine type of (α,β)(α,β), e.g., if (α,β)(α,β) is a counterexample to Littlewood’s conjecture, then we only need that εQεQ tends to infinity. Our result yields a new upper bound on sums of reciprocals of products of fractional parts and sheds some light on a recent question of Lê and Vaaler.
Original languageEnglish
Pages (from-to)83-93
Number of pages11
JournalRamanujan Journal
Issue number1
Early online date29 Mar 2016
Publication statusPublished - May 2017
This open access research output is licenced under a Creative Commons Attribution-NonCommercial-NoDerivs 3.0 Unported License.

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