A hidden signal in Hofstadter's H sequence

Abstract

The Hofstadter H sequence is defined by H(1) = 1 and H(n) = n-H(H(H(n-1))) for n > 1. If α is the real root of x3+x=1 we show that the numbers α H(n) 1 are not uniformly distributed on [0,1], but converge to a distribution we believe is continuous but not differentiable. This is motivated by a discovery of Steinerberger, who found a real number with similar behavior for the Ulam sequence. Our result is related with the fact that a certain sequence defined from the linear recurrence hn=hn-1+hn-3 has the property \|x hn\| → 0 precisely for x ∈ Z[α], a phenomenon we inquire for general linear recurrent sequences of integers.