Explicit bounds for generators of the class group

Abstract

Assuming Generalized Riemann's Hypothesis, Bach proved that the class group C\! K of a number field K may be generated using prime ideals whose norm is bounded by 122 K, and by (4+o(1))2 K asymptotically, where K is the absolute value of the discriminant of K. Under the same assumption, Belabas, Diaz y Diaz and Friedman showed a way to determine a set of prime ideals that generates C\! K and which performs better than Bach's bound in computations, but which is asymptotically worse. In this paper we show that C\! K is generated by prime ideals whose norm is bounded by the minimum of 4.012 K, 4(1+(2π eγ)-n K)22 K and 4( K+ K-(γ+ 2π)n K+1+(n K+1)(7 K) K)2. Moreover, we prove explicit upper bounds for the size of the set determined by Belabas, Diaz y Diaz and Friedman's algorithms, confirming that it has size ( K K)2. In addition, we propose a different algorithm which produces a set of generators which satisfies the above mentioned bounds and in explicit computations turns out to be experimentally smaller than 2 K except for 7 out of 31000 fields.