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Autore principale: Kelmendi, Edon
Natura: Preprint
Pubblicazione: 2021
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Accesso online:https://arxiv.org/abs/2109.14432
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author Kelmendi, Edon
author_facet Kelmendi, Edon
contents The set of indices that correspond to the positive entries of a sequence of numbers is called its positivity set. In this paper, we study the density of the positivity set of a given linear recurrence sequence, that is the question of how much more frequent are the positive entries compared to the non-positive ones. We show that one can compute this density to arbitrary precision, as well as decide whether it is equal to zero (or one). If the sequence is diagonalisable, we prove that its positivity set is finite if and only if its density is zero. Further, arithmetic properties of densities are treated, in particular we prove that it is decidable whether the density is a rational number, given that the recurrence sequence has at most one pair of dominant complex roots. Finally, we generalise all these results to symbolic orbits of linear dynamical systems, thereby showing that one can decide various properties of such systems, up to a set of density zero.
format Preprint
id arxiv_https___arxiv_org_abs_2109_14432
institution arXiv
publishDate 2021
record_format arxiv
spellingShingle Computing the Density of the Positivity Set for Linear Recurrence Sequences
Kelmendi, Edon
Number Theory
The set of indices that correspond to the positive entries of a sequence of numbers is called its positivity set. In this paper, we study the density of the positivity set of a given linear recurrence sequence, that is the question of how much more frequent are the positive entries compared to the non-positive ones. We show that one can compute this density to arbitrary precision, as well as decide whether it is equal to zero (or one). If the sequence is diagonalisable, we prove that its positivity set is finite if and only if its density is zero. Further, arithmetic properties of densities are treated, in particular we prove that it is decidable whether the density is a rational number, given that the recurrence sequence has at most one pair of dominant complex roots. Finally, we generalise all these results to symbolic orbits of linear dynamical systems, thereby showing that one can decide various properties of such systems, up to a set of density zero.
title Computing the Density of the Positivity Set for Linear Recurrence Sequences
topic Number Theory
url https://arxiv.org/abs/2109.14432