Diophantine approximation by negative continued fraction

Abstract

We show that the growth rate of denominator Qn of the n-th convergent of negative expansion of x and the rate of approximation: nn|x-PnQn|→ -π23 in measure. for a.e. x. In the course of the proof, we reprove known inspiring results that arithmetic mean of digits of negative continued fraction converges to 3 in measure, although the limit inferior is 2, and the limit superior is infinite almost everywhere.