On standard bases in rings of differential polynomials

Let \(R\) be a commutative ring with 1 , let \(R\left[X_{1}, \ldots, X_{n}\right]\) be the polynomial ring in \(X_{1}, \ldots, X_{n}\) over \(R\) and let \(G\) be an arbitrary group of permutations of \(\left\{X_{1}, \ldots, X_{n}\right\}\). The paper presents an algorithm for computing a small fini

Commutative differentially simple rings have proved to be quite useful as a source of examples in noncommutative algebra. In this paper we use the theory of holomorphic foliations to construct new families of derivations with respect to which the polynomial ring over a field of characteristic zero i

We show that w.r.t. fixed admissible term order, every ideal in a ring of power series over a field has a unique reduced standard basis. Furthermore, we show that a finite set of power series whose lowest terms are pairwise relatively prime is a standard basis. Finally, a second criterion for detect