A Simple and Fast Algorithm for Computing the $N$-th Term of a Linearly Recurrent Sequence
Symbolic Computation
2020-08-21 v1
Abstract
We present a simple and fast algorithm for computing the -th term of a given linearly recurrent sequence. Our new algorithm uses arithmetic operations, where is the order of the recurrence, and denotes the number of arithmetic operations for computing the product of two polynomials of degree . The state-of-the-art algorithm, due to Charles Fiduccia (1985), has the same arithmetic complexity up to a constant factor. Our algorithm is simpler, faster and obtained by a totally different method. We also discuss several algorithmic applications, notably to polynomial modular exponentiation, powering of matrices and high-order lifting.
Cite
@article{arxiv.2008.08822,
title = {A Simple and Fast Algorithm for Computing the $N$-th Term of a Linearly Recurrent Sequence},
author = {Alin Bostan and Ryuhei Mori},
journal= {arXiv preprint arXiv:2008.08822},
year = {2020}
}
Comments
34 pages