Natural extensions and entropy of α-continued fractions

Abstract

We construct a natural extension for each of Nakada's α-continued fractions and show the continuity as a function of α of both the entropy and the measure of the natural extension domain with respect to the density function (1+xy)-2. In particular, we show that, for all 0 < α 1, the product of the entropy with the measure of the domain equals π2/6. As a key step, we give the explicit relationship between the α-expansion of α-1 and of α.