AbstractLetkbe an algebraic number field. We describe a procedure for computing the Hilbert class fieldΓ(k) ofk, i.e., the maximal abelian extension unramified at all places. In the first part of the paper we outline the underlying theory and in the second part we present the important algorithms and give several examples
Let K be a quartic CM field, that is, a totally imaginary quadratic extension of a real quadratic nu...
AbstractAssume that K is either a totally real or a totally imaginary number field. Let F be the max...
AbstractAssume that K is either a totally real or a totally imaginary number field. Let F be the max...
AbstractLetkbe an algebraic number field. We describe a procedure for computing the Hilbert class fi...
Let K be a quartic CM field, that is, a totally imaginary quadratic extension of a real quadratic nu...
We exhibit an algorithm for the computation of Hilbert modular forms over an arbitrary totally real ...
AbstractLet K be an unramified abelian extension of a number field F with Galois group G. We conside...
AbstractFor real biquadratic fields, the class number formula shows that in many cases the Hilbert c...
Soit (K, Φ) une paire CM quartique primitive et (Kr , Φr ) son réflexe. Dans un article de 1962 inti...
AbstractLet K be a finite Galois extension of a number field F and K′ the Hilbert class field of K. ...
AbstractFor real biquadratic fields, the class number formula shows that in many cases the Hilbert c...
AbstractOne of the main contributions which Volker Weispfenning made to mathematics is related to Gr...
The current article studies the relation between the j−invariant function of elliptic curves with co...
AbstractLet k be an algebraic number field containing a primitive m th root of unity. An extension K...
AbstractLet k be a number field of finite degree. The narrow genus field K of k (genus field of k in...
Let K be a quartic CM field, that is, a totally imaginary quadratic extension of a real quadratic nu...
AbstractAssume that K is either a totally real or a totally imaginary number field. Let F be the max...
AbstractAssume that K is either a totally real or a totally imaginary number field. Let F be the max...
AbstractLetkbe an algebraic number field. We describe a procedure for computing the Hilbert class fi...
Let K be a quartic CM field, that is, a totally imaginary quadratic extension of a real quadratic nu...
We exhibit an algorithm for the computation of Hilbert modular forms over an arbitrary totally real ...
AbstractLet K be an unramified abelian extension of a number field F with Galois group G. We conside...
AbstractFor real biquadratic fields, the class number formula shows that in many cases the Hilbert c...
Soit (K, Φ) une paire CM quartique primitive et (Kr , Φr ) son réflexe. Dans un article de 1962 inti...
AbstractLet K be a finite Galois extension of a number field F and K′ the Hilbert class field of K. ...
AbstractFor real biquadratic fields, the class number formula shows that in many cases the Hilbert c...
AbstractOne of the main contributions which Volker Weispfenning made to mathematics is related to Gr...
The current article studies the relation between the j−invariant function of elliptic curves with co...
AbstractLet k be an algebraic number field containing a primitive m th root of unity. An extension K...
AbstractLet k be a number field of finite degree. The narrow genus field K of k (genus field of k in...
Let K be a quartic CM field, that is, a totally imaginary quadratic extension of a real quadratic nu...
AbstractAssume that K is either a totally real or a totally imaginary number field. Let F be the max...
AbstractAssume that K is either a totally real or a totally imaginary number field. Let F be the max...
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