Quantitative inhomogeneous Diophantine approximation for systems of linear forms
Abstract
The inhomogeneous Khintchine-Groshev Theorem is a classical generalization of Khintchine's Theorem in Diophantine approximation, by approximating points in Rm by systems of linear forms in n variables. Analogous to the question considered by Duffin and Schaeffer for Khintchine's Theorem (which is the case m = n = 1), the question arises for which m,n the monotonicity can be safely removed. If m = n = 1, it is known that monotonicity is needed. Recently, Allen and Ramirez showed that for mn ≥ 3, the monotonicity assumption is unnecessary, conjecturing this to also hold when mn = 2. In this article, we confirm this conjecture for the case (m,n)=(1,2) whenever the inhomogeneous parameter is a non-Liouville irrational number. Furthermore, under mild assumptions on the approximation function, we show an asymptotic formula (with almost square-root cancellation), which is not even known for homogeneous approximation. The proof makes use of refined overlap estimates in the 1-dimensional setting, which may have other applications including the inhomogeneous Duffin-Schaeffer conjecture.
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