Metric properties of continued fractions with large prime partial quotients

Abstract

Let x ∈ [0,1) with continued fraction expansion [a1(x),a2(x),…], and let ϕ:N+ be a non-decreasing function. We consider the numbers whose continued fraction expansions contain at least two partial quotients that are simultaneously large and prime, that is \[ E'(ϕ):=\x∈[0,1): ∃\, 1≤ k≠ l≤ n, \ a'k(x),\ a'l(x)≥ϕ(n) \ for i.m. n∈N\, \] where a'i(x) denotes ai(x) if ai(x) is prime and 0 otherwise. We establish a zero-one law for the Lebesgue measure of E'(ϕ) and determine its Hausdorff dimension.