On $n$-Dimensional Sequences. I
Abstract
Let be a commutative ring and let We study , the generating function and Ann, the ideal of characteristic polynomials of , an --dimensional sequence over . We express as a partitioned sum. That is, we give (i) a --fold ``border'' partition (ii) an explicit expression for the product as a --fold sum; the support of each summand is contained in precisely one member of the partition. A key summand is , the ``border polynomial'' of and , which is divisible by . We say that is {\em eventually rectilinear} if the elimination ideals Ann contain an for . In this case, we show that is the ideal quotient When and are factorial domains (e.g. a principal ideal domain or ), we compute {\em the monic generator} of from known or from a finite number of --dimensional linear recurring sequences over . Over a field this gives an algorithm to compute an --basis for .
Keywords
Cite
@article{arxiv.2405.04022,
title = {On $n$-Dimensional Sequences. I},
author = {Graham H. Norton},
journal= {arXiv preprint arXiv:2405.04022},
year = {2024}
}
Comments
This is my original latex document submitted to Journal of Symbolic Computation without the typographical errors which were introduced: 'The Journal apologizes for the typographical errors in Norton (1995) introduced in the subediting process'; see this journal, (1995)20, 769-770