On n-Dimensional Sequences. I
Abstract
Let R be a commutative ring and let n ≥ 1. We study (s), the generating function and Ann(s), the ideal of characteristic polynomials of s, an n--dimensional sequence over R. We express f(X1,…,Xn) · (s)(X1-1,… ,Xn-1) as a partitioned sum. That is, we give (i) a 2n--fold ``border'' partition (ii) an explicit expression for the product as a 2n--fold sum; the support of each summand is contained in precisely one member of the partition. A key summand is β0(f,s), the ``border polynomial'' of f and s, which is divisible by X1·s Xn. We say that s is eventually rectilinear if the elimination ideals Ann(s) R[Xi] contain an fi(Xi) for 1 ≤ i ≤ n. In this case, we show that Ann(s) is the ideal quotient (Σi=1n(fi)\ :\ β0(f,s)/(X1·s Xn)). When R and R[[X1,X2, … ,Xn]] are factorial domains (e.g. R a principal ideal domain or F[X1,…,Xn]), we compute the monic generator γ i of Ann(s) R[Xi] from known fi ∈ Ann(s) R[Xi] or from a finite number of 1--dimensional linear recurring sequences over R. Over a field F this gives an O(Πi=1n δ γ i3) algorithm to compute an F--basis for Ann(s).
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