On computing Gröbner bases in rings of differential operators

We study modules over the ring \(\mathcal{D}_{0}\) of differential operators with power series coeffcients. For \(\mathcal{D}_{0}\)-modules, we introduce a new notion of \(F\)-Gröbner basis and present an algorithmic method to compute it. Our method is more algebraic than that of Castro \((1986,1987

Reduction rings are rings in which the Gröbner bases approach is possible, i.e., the Gröbner basis of an ideal in a reduction ring can be computed using Buchberger's algorithm. We show that one can also compute Gröbner bases of modules over reduction rings. Our approach is much more general than oth

In this paper we will define analogs of Gröbner bases for R-subalgebras and their ideals in a polynomial ring R[x 1 , . . . , xn] where R is a noetherian integral domain with multiplicative identity and in which we can determine ideal membership and compute syzygies. The main goal is to present and