English

Ultimate Positivity is Decidable for Simple Linear Recurrence Sequences

Computational Complexity 2017-04-07 v4 Discrete Mathematics Formal Languages and Automata Theory

Abstract

We consider the decidability and complexity of the Ultimate Positivity Problem, which asks whether all but finitely many terms of a given rational linear recurrence sequence (LRS) are positive. Using lower bounds in Diophantine approximation concerning sums of S-units, we show that for simple LRS (those whose characteristic polynomial has no repeated roots) the Ultimate Positivity Problem is decidable in polynomial space. If we restrict to simple LRS of a fixed order then we obtain a polynomial-time decision procedure. As a complexity lower bound we show that Ultimate Positivity for simple LRS is hard for coR\exists\mathbb{R}, i.e., the class of problems solvable in the universal theory of the reals (which lies between coNP and PSPACE).

Keywords

Cite

@article{arxiv.1309.1914,
  title  = {Ultimate Positivity is Decidable for Simple Linear Recurrence Sequences},
  author = {Joel Ouaknine and James Worrell},
  journal= {arXiv preprint arXiv:1309.1914},
  year   = {2017}
}
R2 v1 2026-06-22T01:22:48.537Z