AbstractThe purpose of this article is to determine all subfields Q(β) of fixed degree of a given algebraic number field Q(α). It is convenient to describe each subfield by a pair (h,g) of polynomials in Q[t] resp. Z[t] such thatgis the minimal polynomial of β=h(α). The computations are done in unramifiedp-adic extensions and use information concerning subgroups of the Galois group of the normal closure of Q(α) obtained from the van der Waerden criterion
Given a field extension K/k of degree n we are interested in finding the subfields of K containing k...
The subject of this thesis in the study of nite extensions of p-adic fields, in different aspects....
We construct unramified Galois extensions over maximal abelian extensions of algebraic number fields...
AbstractThe purpose of this article is to determine all subfields Q(β) of fixed degree of a given al...
AbstractBy means of Gröbner basis techniques algorithms for solving various problems concerning subf...
Let F be a field, f(x) in F[x] an irreducible polynomial of degree six, K the stem field of f, and G...
AbstractUsing a constructive field-ideal correspondence it is shown how to compute the transcendence...
Using a constructive field-ideal correspondence it is shown how to compute the transcendence degree ...
This thesis is concerned with the Galois groups of the root fields of the equations x[superscript]P ...
Several mathematical results and new computational methods are presented for primitive elements and ...
AbstractThe algorithms presented here make use of subfield information to improve computations. For ...
Let f(x) be an irreducible polynomial of odd degree n > 1 whose Galois group is a Frobenius group. W...
We describe algorithms to compute fixed fields, splitting fields and towers of radical extensions wi...
AbstractOne of the main contributions which Volker Weispfenning made to mathematics is related to Gr...
By means of Groebner basis techniques algorithms for solving various problems concerning subfields K...
Given a field extension K/k of degree n we are interested in finding the subfields of K containing k...
The subject of this thesis in the study of nite extensions of p-adic fields, in different aspects....
We construct unramified Galois extensions over maximal abelian extensions of algebraic number fields...
AbstractThe purpose of this article is to determine all subfields Q(β) of fixed degree of a given al...
AbstractBy means of Gröbner basis techniques algorithms for solving various problems concerning subf...
Let F be a field, f(x) in F[x] an irreducible polynomial of degree six, K the stem field of f, and G...
AbstractUsing a constructive field-ideal correspondence it is shown how to compute the transcendence...
Using a constructive field-ideal correspondence it is shown how to compute the transcendence degree ...
This thesis is concerned with the Galois groups of the root fields of the equations x[superscript]P ...
Several mathematical results and new computational methods are presented for primitive elements and ...
AbstractThe algorithms presented here make use of subfield information to improve computations. For ...
Let f(x) be an irreducible polynomial of odd degree n > 1 whose Galois group is a Frobenius group. W...
We describe algorithms to compute fixed fields, splitting fields and towers of radical extensions wi...
AbstractOne of the main contributions which Volker Weispfenning made to mathematics is related to Gr...
By means of Groebner basis techniques algorithms for solving various problems concerning subfields K...
Given a field extension K/k of degree n we are interested in finding the subfields of K containing k...
The subject of this thesis in the study of nite extensions of p-adic fields, in different aspects....
We construct unramified Galois extensions over maximal abelian extensions of algebraic number fields...
DOI
Add to ORKG