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 co, 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}
}