Transcendental Series of Reciprocals of Fibonacci and Lucas Numbers

Abstract

Let F1=1,F2=1,… be the Fibonacci sequence. Motivated by the identity Σk=0∞1F2k=7-52, Erd\"os and Graham asked whether Σk=1∞1Fnk is irrational for any sequence of positive integers n1,n2,… with nk+1nk≥ c>1. We resolve the transcendence counterpart of their question: as a special case of our main theorem, we have that Σk=1∞1Fnk is transcendental when nk+1nk≥ c>2. The bound c>2 is best possible thanks to the identity at the beginning. This paper provides a new way to apply the Subspace Theorem to obtain transcendence results and extends previous non-trivial results obtainable by only Mahler's method for special sequences of the form nk=dk+r.