English

The Multiplicative Persistence Conjecture Is True for Odd Targets

Number Theory 2021-10-11 v1

Abstract

In 1973, Neil Sloane published a very short paper introducing an intriguing problem: Pick a decimal integer nn and multiply all its digits by each other. Repeat the process until a single digit Δ(n)\Delta(n) is obtained. Δ(n)\Delta(n) is called the \textsl{multiplicative digital root of nn} or \textsl{the target of nn}. The number of steps Ξ(n)\Xi(n) needed to reach Δ(n)\Delta(n), called the multiplicative persistence of nn or \textsl{the height of nn} is conjectured to always be at most 1111. Like many other very simple to state number-theoretic conjectures, the multiplicative persistence mystery resisted numerous explanation attempts. This paper proves that the conjecture holds for all odd target values: Namely that if Δ(n){1,3,7,9}\Delta(n)\in\{1,3,7,9\}, then Ξ(n)1\Xi(n) \leq 1 and that if Δ(n)=5\Delta(n)=5, then Ξ(n)5\Xi(n) \leq 5. Naturally, we overview the difficulties currently preventing us from extending the approach to (nonzero) even targets.

Keywords

Cite

@article{arxiv.2110.04263,
  title  = {The Multiplicative Persistence Conjecture Is True for Odd Targets},
  author = {Eric Brier and Christophe Clavier and Linda Gutsche and David Naccache},
  journal= {arXiv preprint arXiv:2110.04263},
  year   = {2021}
}
R2 v1 2026-06-24T06:44:44.015Z