Explicit bounds for generators of the class group
Abstract
Assuming Generalized Riemann's Hypothesis, Bach proved that the class group of a number field may be generated using prime ideals whose norm is bounded by , and by asymptotically, where is the absolute value of the discriminant of . Under the same assumption, Belabas, Diaz y Diaz and Friedman showed a way to determine a set of prime ideals that generates and which performs better than Bach's bound in computations, but which is asymptotically worse. In this paper we show that is generated by prime ideals whose norm is bounded by the minimum of , and . 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 . 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 except for 7 out of 31000 fields.
Keywords
Cite
@article{arxiv.1607.02430,
title = {Explicit bounds for generators of the class group},
author = {Loïc Grenié and Giuseppe Molteni},
journal= {arXiv preprint arXiv:1607.02430},
year = {2019}
}
Comments
v5: corrected a couple of typos