AbstractIn this paper we compare the approach of Briançon and Maisonobe for computing Bernstein–Sato ideals—based on computations in a Poincaré–Birkhoff–Witt algebra—with the readily available method of Oaku and Takayama. We show that it can deal with interesting examples that have proved intractable so far
AbstractA commutative algebra A over the field F, endowed with a nonzero homomorphism ω:A→F, is Bern...
We study a multivariate version of the Bernstein–Sato polynomial, the so-called Bernstein–Sato ideal...
We study a multivariate version of the Bernstein–Sato polynomial, the so-called Bernstein–Sato ideal...
In this paper we compare the approach of Brianc¸onand Maisonobe for computing Bernstein–Sato ideals...
AbstractIn this paper we compare the approach of Briançon and Maisonobe for computing Bernstein–Sato...
AbstractLet k be a field of characteristic 0. Given a polynomial mapping f=(f1,…,fp) from kn to kp, ...
AbstractLet f1, . . . , fpbe polynomials in n variables with coefficients in a fieldK. We associate ...
AbstractLet f1,…,fp be polynomials in C[x1,…,xn] and let D=Dn be the n-th Weyl algebra. We provide u...
Let $f_1,\ldots, f_p$ be polynomials in ${\bf C}[x_1,\ldots, x_n]$ and let $D = D_n$ be the $n$-th ...
Let f1, . . . , fp be polynomials in C[x1, . . . , xn] and let D = Dn be the n-th Weyl algebra. We p...
AbstractLet f1, . . . , fpbe polynomials in n variables with coefficients in a fieldK. We associate ...
AbstractThe theory of Bernstein's algebras is revisited. Many results concerning the structure of Be...
AbstractWe give algorithms for computing multiplier ideals using Gröbner bases in Weyl algebras. To ...
AbstractLet f1,…,fp be polynomials in C[x1,…,xn] and let D=Dn be the n-th Weyl algebra. We provide u...
Abstract. Let f1,..., fp be polynomials in C[x1,..., xn] and let D = Dn be the n-th Weyl algebra. We...
AbstractA commutative algebra A over the field F, endowed with a nonzero homomorphism ω:A→F, is Bern...
We study a multivariate version of the Bernstein–Sato polynomial, the so-called Bernstein–Sato ideal...
We study a multivariate version of the Bernstein–Sato polynomial, the so-called Bernstein–Sato ideal...
In this paper we compare the approach of Brianc¸onand Maisonobe for computing Bernstein–Sato ideals...
AbstractIn this paper we compare the approach of Briançon and Maisonobe for computing Bernstein–Sato...
AbstractLet k be a field of characteristic 0. Given a polynomial mapping f=(f1,…,fp) from kn to kp, ...
AbstractLet f1, . . . , fpbe polynomials in n variables with coefficients in a fieldK. We associate ...
AbstractLet f1,…,fp be polynomials in C[x1,…,xn] and let D=Dn be the n-th Weyl algebra. We provide u...
Let $f_1,\ldots, f_p$ be polynomials in ${\bf C}[x_1,\ldots, x_n]$ and let $D = D_n$ be the $n$-th ...
Let f1, . . . , fp be polynomials in C[x1, . . . , xn] and let D = Dn be the n-th Weyl algebra. We p...
AbstractLet f1, . . . , fpbe polynomials in n variables with coefficients in a fieldK. We associate ...
AbstractThe theory of Bernstein's algebras is revisited. Many results concerning the structure of Be...
AbstractWe give algorithms for computing multiplier ideals using Gröbner bases in Weyl algebras. To ...
AbstractLet f1,…,fp be polynomials in C[x1,…,xn] and let D=Dn be the n-th Weyl algebra. We provide u...
Abstract. Let f1,..., fp be polynomials in C[x1,..., xn] and let D = Dn be the n-th Weyl algebra. We...
AbstractA commutative algebra A over the field F, endowed with a nonzero homomorphism ω:A→F, is Bern...
We study a multivariate version of the Bernstein–Sato polynomial, the so-called Bernstein–Sato ideal...
We study a multivariate version of the Bernstein–Sato polynomial, the so-called Bernstein–Sato ideal...
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