Abstract
The aim of this paper is to give new upper bounds for Euclidean minima of algebraic number fields. In particular, to show that Minkowski's conjecture holds for the maximal totally real subfields of cyclotomic fields of prime power conductor.
Details
Title
Upper bounds for Euclidean minima of algebraic number fields
Author(s)
Bayer Fluckiger, Eva
Published in
Journal of Number Theory
Volume
121
Issue
2
Pages
305-323
Date
2006
Other identifier(s)
DOI: https://doi.org/10.1016/j.jnt.2006.03.002
Laboratories
CSAG
Record Appears in
Scientific production and competences > SB - School of Basic Sciences > SB Archives > CSAG - Chair of Algebraic and Geometric Structures
Scientific production and competences > SB - School of Basic Sciences > Mathematics
Peer-reviewed publications
Work produced at EPFL
Journal Articles
Published
Scientific production and competences > SB - School of Basic Sciences > Mathematics
Peer-reviewed publications
Work produced at EPFL
Journal Articles
Published
Record creation date
2020-05-06