Irrationality of rapidly converging series: a problem of Erdos and Graham

Abstract

Answering a question of Erdos and Graham, we show that the double exponential growth condition n∞an1/φn=∞ for a strictly increasing sequence of positive integers \an\n=1∞ is sufficient for the series Σn=1∞ 1/(an an+1) to have an irrational sum; here φ denotes the golden ratio. We also provide a positive generalization to Σn=1∞ 1/(anw0·s an+d-1wd-1), and a negative result showing that some of its instances are essentially optimal. The original problem was autonomously solved by the AI agent Aletheia, powered by Gemini Deep Think, while the remaining material is largely a product of human-AI interactions.