Reduced Gr\"obner Bases and Macaulay-Buchberger Basis Theorem over Noetherian Rings

Abstract

In this paper, we extend the characterization of Z[x]/\ < f \ >, where f ∈ Z[x] to be a free Z-module to multivariate polynomial rings over any commutative Noetherian ring, A. The characterization allows us to extend the Gr\"obner basis method of computing a -vector space basis of residue class polynomial rings over a field (Macaulay-Buchberger Basis Theorem) to rings, i.e. A[x1,…,xn]/a, where a ⊂eq A[x1,…,xn] is an ideal. We give some insights into the characterization for two special cases, when A = Z and A = [θ1,…,θm]. As an application of this characterization, we show that the concept of border bases can be extended to rings when the corresponding residue class ring is a finitely generated, free A-module.