Badly approximable numbers for sequences of balls

Abstract

It is a classical result from Diophantine approximation that the set of badly approximable numbers has Lebesgue measure zero. In this paper we generalise this result to more general sequences of balls. Given a countable set of closed d-dimensional Euclidean balls \B(xi,ri)\i=1∞, we say that α∈ Rd is a badly approximable number with respect to \B(xi,ri)\i=1∞ if there exists (α)>0 and N(α)∈N such that α B(xi,(α)ri) for all i≥ N(α). Under natural conditions on the set of balls, we prove that the set of badly approximable numbers with respect to \B(xi,ri)\i=1∞ has Lebesgue measure zero. Moreover, our approach yields a new proof that the set of badly approximable numbers has Lebesgue measure zero.