Upper and lower fast Khintchine spectra in continued fractions

Abstract

For an irrational number x∈ [0,1), let x=[a\1(x), a\2(x),·s] be its continued fraction expansion. Let : N → N be a function with (n)/n ∞ as n∞. The (upper, lower) fast Khintchine spectrum for is defined as the Hausdorff dimension of the set of numbers x∈ (0,1) for which the (upper, lower) limit of 1(n)Σ\j=1n a\j(x) is equal to 1. The fast Khintchine spectrum was determined by Fan, Liao, Wang, and Wu. We calculate the upper and lower fast Khintchine spectra. These three spectra can be different.