Hilbert Class Fields of Real Biquadratic Fields

Let k be an algebraic number field. We describe a procedure for computing the Hilbert class field 1(k) of k, 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 gi

We show that for a real quadratic field F the dihedral congruence primes with respect to F for cusp forms of weight k and quadratic nebentypus are essentially the primes dividing expressions of the form e kÀ1 þ AE 1 where e þ is a totally positive fundamental unit of F . This extends work of Hida.

A method for determining the rank of the 2-class group of imaginary bicyclic biquadratic fields is described. This method is used to determine all such fields with cyclic 2-class group. We also determine the structure of the 2 -class group in several cases when it is noncyclic. 1995 Academic Press.

We determine all real quadratic number fields with 2-class field tower of length at most 1.

We obtain lower bounds for the asymptotic number of rational points of smooth algebraic curves over finite fields. To do this we construct infinite Hilbert class field towers with good parameters. In this way we improve bounds of Serre, Perret, and Niederreiter and Xing.