Zero Sets of Generators and Differential Ideals

## Abstract Generalized second order differential operators of the form $ {d \over {d \mu}} {d \over {dx}} $ when __μ__ is a selfsimilar measure whose support is the classical Cantor set are considered. The asymptotic distribution of the zeros of the eigenfunctions is determined. (© 2004 WILEY‐VCH

We present an algorithm that computes an unmixed-dimensional decomposition of a finitely generated perfect differential ideal I. Each I i in the decomposition I = I 1 ∩ • • • ∩ I k is given by its characteristic set. This decomposition is a generalization of the differential case of Kalkbrener's dec

Let \(A\) be a commutative Noetherian and reduced ring. If \(A\) has an étale covering \(B\) such that all the irreducible components of \(B\) are geometric unibranches, we will construct an invariant ideal \(\gamma(A)\) of \(A\) which has the following properties: If \(A\) is an algebra over some r