Shift Equivalence of P-finite Sequences

Manuel Kauers

doi:10.37236/1126

Shift Equivalence of P-finite Sequences

Manuel Kauers

Research Institute for Symbolic Computation

Research output: Contribution to journal › Article › peer-review

Abstract

We present an algorithm which decides the shift equivalence problem for P-finite sequences. A sequence is called P-finite if it satisfies a homogeneous linear recurrence equation with polynomial coefficients. Two sequences are called shift equivalent if shifting one of the sequences $s$ times makes it identical to the other, for some integer~$s$. Our algorithm computes, for any two P-finite sequences, given via recurrence equation and initial values, all integers $s$ such that shifting the first sequence $s$ times yields the second.

Original language	English
Pages (from-to)	1-16
Number of pages	16
Journal	The Electronic Journal of Combinatorics
Volume	13
Issue number	1
DOIs	https://doi.org/10.37236/1126
Publication status	Published - 06 Nov 2006

Fields of science

101 Mathematics
101001 Algebra
101005 Computer algebra
101009 Geometry
101012 Combinatorics
101013 Mathematical logic
101020 Technical mathematics

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AB - We present an algorithm which decides the shift equivalence problem for P-finite sequences. A sequence is called P-finite if it satisfies a homogeneous linear recurrence equation with polynomial coefficients. Two sequences are called shift equivalent if shifting one of the sequences $s$ times makes it identical to the other, for some integer~$s$. Our algorithm computes, for any two P-finite sequences, given via recurrence equation and initial values, all integers $s$ such that shifting the first sequence $s$ times yields the second.

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Shift Equivalence of P-finite Sequences

Abstract

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