Diophantine approximation in angular domains

Abstract

Let α and β be real numbers such that 1, α and β are linearly independent over Q. A classical result of Dirichlet asserts that there are infinitely many triples of integers (x0,x1,x2) such that |x0+α x1+β x2| < \|x1|,|x2|\-2. In 1976, W. M. Schmidt asked what can be said under the restriction that x1 and x2 be positive. Upon denoting by γ 1.618 the golden ratio, he proved that there are triples (x0,x1,x2) ∈ Z3 with x1,x2>0 for which the product |x0 + α x1 + β x2| \|x1|,|x2|\γ is arbitrarily small. Although Schmidt later conjectured that γ can be replaced by any number smaller than 2, N. Moshchevitin proved very recently that it cannot be replaced by a number larger than 1.947. In this paper, we present a construction showing that the result of Schmidt is in fact optimal.