On the variation of the sum of digits in the Zeckendorf representation: an algorithm to compute the distribution and mixing properties

Abstract

We study probability measures defined by the variation of the sum of digits in the Zeckendorf representation. For r 0 and d∈Z, we consider μ(r)(d) the density of integers n∈N for which the sum of digits increases by d when r is added to n. We give a probabilistic interpretation of μ(r) via the dynamical system provided by the odometer of Zeckendorf-adic integers and its unique invariant measure. We give an algorithm for computing μ(r) and we deduce a control on the tail of the negative distribution of μ(r), as well as the formula μ(F) = μ(1) where F is a term in the Fibonacci sequence. Finally, we decompose the Zeckendorf representation of an integer r into so-called "blocks" and show that when added to an adic Zeckendorf integer, the successive actions of these blocks can be seen as a sequence of mixing random variables.