Full dimensional sets of reals whose sums of partial quotients increase in certain speed

Abstract

For a real x∈(0,1), let x=[a1(x),a2(x),·s] be its continued fraction expansion. Let sn(x)=Σj=1n aj(x). The Hausdorff dimensions of the level sets E(n),α:=\x∈(0,1): n→∞sn(x)(n)=α\ for α≥ 0 and a non-decreasing sequence \(n)\n=1∞ have been studied by E. Cesaratto, B. Vall\'ee, J. Wu, J. Xu, G. Iommi, T. Jordan, L. Liao, M. Rams et al. In this work we carry out a kind of inverse project of their work, that is, we consider the conditions on (n) under which one can expect a 1-dimensional set E(n),α. We give certain upper and lower bounds on the increasing speed of (n) when E(n),α is of Hausdorff dimension 1 and a new class of sequences \(n)\n=1∞ such that E(n),α is of full dimension. There is also a discussion of the problem in the irregular case.