It is a longstanding open problem whether there is an algorithm to decide the Skolem Problem for linear recurrence sequences, namely whether a given such sequence has a zero term. In this paper we introduce the notion of a Universal Skolem Set: an infinite subset S of the positive integers such that there is an effective procedure that inputs a linear recurrence sequence u = (u(n)) n ≥ 0 and decides whether u(n) = 0 for some n∈S. The main technical contribution of the paper is to exhibit such a set
International audienceWe improve by one exponential W. M. Schmidt's estimate for the Skolem-Mahler-L...
We study decidability and complexity questions related to a continu- ous analogue of the Skolem-Piso...
AbstractWe study decidability and complexity questions related to a continuous analogue of the Skole...
The Skolem Problem asks to decide whether a given integer linear recurrence sequence (LRS) has a zer...
The celebrated Skolem-Mahler-Lech Theorem states that the set of zeros of a linear recurrence sequen...
The Skolem Problem asks to determine whether a given integer linear recurrence sequence has a zero t...
It is a longstanding open problem whether there is an algorithm to decide the Skolem Problem for lin...
The Skolem Problem asks, given a linear recurrence sequence (un), whether there exists n ∈ N such th...
Given an integer linear recurrence sequence ?X_n?, the Skolem Problem asks to determine whether ther...
AbstractA Skolem sequence is a sequence s1,s2,…,s2n (where si∈A={1,…,n}), each si occurs exactly twi...
Linear recurrence sequences permeate a vast number of areas of mathematics and computer science. In ...
Given a linear recurrence sequence (LRS), specified using the initial conditions and the recurrence ...
We show that in a parametric family of linear recurrence sequences $a_1(\alpha) f_1(\alpha)^n + \ldo...
AbstractA Skolem sequence is a sequence a1,a2,…,a2n (where ai∈A={1,…,n}), each ai occurs exactly twi...
We study the decidability of the Skolem Problem, the Positivity Problem, and the Ultimate Positivity...
International audienceWe improve by one exponential W. M. Schmidt's estimate for the Skolem-Mahler-L...
We study decidability and complexity questions related to a continu- ous analogue of the Skolem-Piso...
AbstractWe study decidability and complexity questions related to a continuous analogue of the Skole...
The Skolem Problem asks to decide whether a given integer linear recurrence sequence (LRS) has a zer...
The celebrated Skolem-Mahler-Lech Theorem states that the set of zeros of a linear recurrence sequen...
The Skolem Problem asks to determine whether a given integer linear recurrence sequence has a zero t...
It is a longstanding open problem whether there is an algorithm to decide the Skolem Problem for lin...
The Skolem Problem asks, given a linear recurrence sequence (un), whether there exists n ∈ N such th...
Given an integer linear recurrence sequence ?X_n?, the Skolem Problem asks to determine whether ther...
AbstractA Skolem sequence is a sequence s1,s2,…,s2n (where si∈A={1,…,n}), each si occurs exactly twi...
Linear recurrence sequences permeate a vast number of areas of mathematics and computer science. In ...
Given a linear recurrence sequence (LRS), specified using the initial conditions and the recurrence ...
We show that in a parametric family of linear recurrence sequences $a_1(\alpha) f_1(\alpha)^n + \ldo...
AbstractA Skolem sequence is a sequence a1,a2,…,a2n (where ai∈A={1,…,n}), each ai occurs exactly twi...
We study the decidability of the Skolem Problem, the Positivity Problem, and the Ultimate Positivity...
International audienceWe improve by one exponential W. M. Schmidt's estimate for the Skolem-Mahler-L...
We study decidability and complexity questions related to a continu- ous analogue of the Skolem-Piso...
AbstractWe study decidability and complexity questions related to a continuous analogue of the Skole...