AbstractIn this paper, we present an optimal, exponential space algorithm for generating the reduced Gröbner basis of binomial ideals. We make use of the close relationship between commutative semigroups and pure difference binomial ideals. Based on an optimal algorithm for the uniform word problem in commutative semigroups, we first derive an exponential space algorithm for constructing the reduced Gröbner basis of pure difference binomial ideals. In addition to some applications to finitely presented commutative semigroups, this algorithm is then extended to an exponential space algorithm for generating the reduced Gröbner basis of binomial ideals over Q in general
International audienceGröbner bases is one the most powerful tools in algorithmic non-linear algebra...
Let I be an ideal in the polynomial ring k[x] over a eld k. Saturation of I by the product x1 xn,...
This thesis consists of six papers. In Paper I, we give an algorithm for merging sorted lists of mon...
AbstractIt is known that the reduced Gröbner basis of general polynomial ideals can be computed in e...
AbstractIn this paper, we present an optimal, exponential space algorithm for generating the reduced...
We specialize Möller’s algorithm to the computation of Gröbner bases related to lattices. We give th...
AbstractA binomial ideal is an ideal of the polynomial ring which is generated by binomials. In a pr...
In this thesis, we study the basis sets of pure difference ideals, that is, ideals that are generate...
A binomial ideal is an ideal of the polynomial ring which is gener- ated by binomials. In a previous...
AbstractA new solution of the uniform word problem for finitely presented commutative semigroups is ...
AbstractWe prove that any orderOof any algebraic number field K is a reduction ring. Rather than sho...
AbstractWe present an efficient algorithm for the transformation of a Gröbner basis of a zero-dimens...
AbstractGröbner bases are distinguished sets of generators of ideals in polynomial rings. They can b...
In this paper a new notion of reduction depending on an arbitrary non-empty set ORD of term ordering...
The theory of Gröbner bases has become a useful tool in computational commutative algebra. In this p...
International audienceGröbner bases is one the most powerful tools in algorithmic non-linear algebra...
Let I be an ideal in the polynomial ring k[x] over a eld k. Saturation of I by the product x1 xn,...
This thesis consists of six papers. In Paper I, we give an algorithm for merging sorted lists of mon...
AbstractIt is known that the reduced Gröbner basis of general polynomial ideals can be computed in e...
AbstractIn this paper, we present an optimal, exponential space algorithm for generating the reduced...
We specialize Möller’s algorithm to the computation of Gröbner bases related to lattices. We give th...
AbstractA binomial ideal is an ideal of the polynomial ring which is generated by binomials. In a pr...
In this thesis, we study the basis sets of pure difference ideals, that is, ideals that are generate...
A binomial ideal is an ideal of the polynomial ring which is gener- ated by binomials. In a previous...
AbstractA new solution of the uniform word problem for finitely presented commutative semigroups is ...
AbstractWe prove that any orderOof any algebraic number field K is a reduction ring. Rather than sho...
AbstractWe present an efficient algorithm for the transformation of a Gröbner basis of a zero-dimens...
AbstractGröbner bases are distinguished sets of generators of ideals in polynomial rings. They can b...
In this paper a new notion of reduction depending on an arbitrary non-empty set ORD of term ordering...
The theory of Gröbner bases has become a useful tool in computational commutative algebra. In this p...
International audienceGröbner bases is one the most powerful tools in algorithmic non-linear algebra...
Let I be an ideal in the polynomial ring k[x] over a eld k. Saturation of I by the product x1 xn,...
This thesis consists of six papers. In Paper I, we give an algorithm for merging sorted lists of mon...