English

On a perturbed Hofstadter $Q$-recursion

Number Theory 2026-04-09 v1

Abstract

The Hofstadter Q-sequence is a prominent example of nested recurrence. Despite decades of study, it is not even known whether Q(n) is defined for all n. Mantovanelli introduced a parity-perturbed variant Q~\widetilde{Q}, obtained by adding (1)n(-1)^n to the recursion, which surprisingly replaces the chaotic behaviour of Q by an exact dyadic self-similarity. In this paper we prove that Q~\widetilde{Q} is well-defined for all n and satisfies Q~(n)/n1/2=O(1/logn)|\widetilde{Q}(n)/n - 1/2| = O(1/\sqrt{\log n}). The proof exploits the self-similar structure of the sequence, where alternating arches arise whose frequency combinatorics are governed by the Catalan numbers. A complementary analysis of the arch amplitudes, conditional on two minimal conjectural properties, refines the asymptotic formula to lim supnQ~(n)/n1/2log2n=1/(32π)\limsup_{n\to\infty} |\widetilde{Q}(n)/n - 1/2| \sqrt{\log_2 n} = 1/(3\sqrt{2\pi}). Numerical experiments suggest the conjecture Q(n)Q~(n)=O(n/logn)Q(n) - \widetilde{Q}(n) = O(n/\sqrt{\log n}), indicating that Q~\widetilde{Q} may serve as a tractable proxy for Q. This experimental direction will be investigated elsewhere.

Cite

@article{arxiv.2604.06237,
  title  = {On a perturbed Hofstadter $Q$-recursion},
  author = {Benoit Cloitre},
  journal= {arXiv preprint arXiv:2604.06237},
  year   = {2026}
}

Comments

30 pages, 7 figures, 14 references

R2 v1 2026-07-01T11:57:59.906Z