Continued fractions for strong Engel series and L\"uroth series with signs

Abstract

An Engel series is a sum of reciprocals Σj≥ 1 1/xj of a non-decreasing sequence of positive integers xn with the property that xn divides xn+1 for all n≥ 1. In previous work, we have shown that for any Engel series with the stronger property that xn2 divides xn+1, the continued fraction expansion of the sum is determined explicitly in terms of z1=x1 and the ratios zn=xn/xn-12 for n≥ 2. Here we show that, when this stronger property holds, the same is true for a sum Σj≥ 1εj/xj with an arbitrary sequence of signs εj= 1. As an application, we use this result to provide explicit continued fractions for particular families of L\"uroth series and alternating L\"uroth series defined by nonlinear recurrences of second order. We also calculate exact irrationality exponents for certain families of transcendental numbers defined by such series.