On several irrationality problems for Ahmes series

Abstract

Using basic tools of mathematical analysis and elementary probability theory we address several problems on the irrationality of series of distinct unit fractions, Σk 1/ak. In particular, we study subseries of the Lambert series Σk 1/(tk-1) and two types of irrationality sequences (ak) introduced by Paul Erdos and Ronald Graham. Next, we address a question of Erdos, who asked how rapidly a sequence of positive integers (ak) can grow if both series Σk 1/ak and Σk 1/(ak+1) have rational sums. Our construction of double exponentially growing sequences (ak) with this property generalizes to any number d of series Σk 1/(ak+j), j=0,1,2,…,d-1, and, in particular, also gives a positive answer to a question of Erdos and Ernst Straus on the interior of the set of d-tuples of their sums. Finally, we prove the existence of a sequence (ak) such that all well-defined sums Σk 1/(ak+t), t∈Z, are rational numbers, giving a negative answer to a conjecture by Kenneth Stolarsky.