The Zeckendorf expansion of polynomial sequences (Q558120)

This paper is devoted to the study of digital expansions, such as the standard \(q\)-ary expansion and mainly to the expansion with respect to Fibonacci numbers, the so-called Zeckendorf expansion. The authors prove that the Zeckendorf sum-of-digits function \(s_{Z}(n)\) and similarly defined functions evaluated on polynomial sequences of positive integers or primes satisfy a central limit theorem. They also show that the Zeckendorf expansion and the \(q\)-ary expansion of integers are asymptotically independent.