The purpose of this paper is to give a complete effective solution to the problem of computing radicals of polynomial ideals over general fields of arbitrary characteristic. We prove that Seidenberg’s “Condition P” is both a necessary and sufficient property of the coefficient field in order to be able to perform this computation. Since Condition P is an expensive additional requirement on the ground field, we use derivations and ideal quotients to recover as much of the radical as possible. If we have a basis for the vector space of derivations on our ground field, then the problem of computing radicals can be reduced to computing pth roots of elements in finite dimensional algebras
The aim of this project is to determine the solvability by radicals of polynomials of different degr...
Colloque avec actes et comité de lecture. internationale.International audienceAny textbook on Galoi...
We derive recurrent formulas for obtaining minimal polynomials for values of tangents and show that ...
AbstractThe purpose of this paper is to give a complete effective solution to the problem of computi...
The purpose of this paper is to give a complete effective solution to the problem of computing radic...
AbstractWe propose a method for computing the radical of an arbitrary ideal in the polynomial ring i...
We give an algorithm which represents the radical J of a finitely generated differential ideal as an...
This paper shows an algorithm to construct the Gröbner bases of radicals of zero-dimensional ideals....
AbstractIn this paper we are concerned with the computation of prime decompositions of radicals in p...
AbstractIn the present paper we describe an algorithm for the computation of real radicals of polyno...
AbstractWe propose an algorithm for computing the radical of a polynomial ideal in positive characte...
International audienceThis paper presents an algorithm for decomposing any positive-dimensional poly...
In this paper, we describe new methods to compute the radical (resp. real radical) of an ideal, ass...
By results of Slin’ko and of Anderson, the locally nilpotent and nil radicals of algebras over a fie...
We present an algorithm to compute the primary decomposition of any ideal in a polynomialring over a...
The aim of this project is to determine the solvability by radicals of polynomials of different degr...
Colloque avec actes et comité de lecture. internationale.International audienceAny textbook on Galoi...
We derive recurrent formulas for obtaining minimal polynomials for values of tangents and show that ...
AbstractThe purpose of this paper is to give a complete effective solution to the problem of computi...
The purpose of this paper is to give a complete effective solution to the problem of computing radic...
AbstractWe propose a method for computing the radical of an arbitrary ideal in the polynomial ring i...
We give an algorithm which represents the radical J of a finitely generated differential ideal as an...
This paper shows an algorithm to construct the Gröbner bases of radicals of zero-dimensional ideals....
AbstractIn this paper we are concerned with the computation of prime decompositions of radicals in p...
AbstractIn the present paper we describe an algorithm for the computation of real radicals of polyno...
AbstractWe propose an algorithm for computing the radical of a polynomial ideal in positive characte...
International audienceThis paper presents an algorithm for decomposing any positive-dimensional poly...
In this paper, we describe new methods to compute the radical (resp. real radical) of an ideal, ass...
By results of Slin’ko and of Anderson, the locally nilpotent and nil radicals of algebras over a fie...
We present an algorithm to compute the primary decomposition of any ideal in a polynomialring over a...
The aim of this project is to determine the solvability by radicals of polynomials of different degr...
Colloque avec actes et comité de lecture. internationale.International audienceAny textbook on Galoi...
We derive recurrent formulas for obtaining minimal polynomials for values of tangents and show that ...