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Autori principali: Elezi, Artur, Shaska, Tony
Natura: Preprint
Pubblicazione: 2017
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Accesso online:https://arxiv.org/abs/1705.02618
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_version_ 1866911975345225728
author Elezi, Artur
Shaska, Tony
author_facet Elezi, Artur
Shaska, Tony
contents In this paper we provide an alternative reduction theory for real, binary forms with no real roots. Our approach is completely geometric, making use of the notion of hyperbolic center of mass in the upper half-plane. It appears that our model compares favorably with existing reduction theories, at least in certain aspects related to the field of definition. Various tools and features of hyperbolic geometry that are interesting in themselves, but also relevant for our and various other reduction theories papers (\cite{julia} and \cite{SC}), are also treated in detail and in a self-contained way here.
format Preprint
id arxiv_https___arxiv_org_abs_1705_02618
institution arXiv
publishDate 2017
record_format arxiv
spellingShingle Reduction of binary forms via the hyperbolic center of mass
Elezi, Artur
Shaska, Tony
Metric Geometry
Number Theory
51F99
In this paper we provide an alternative reduction theory for real, binary forms with no real roots. Our approach is completely geometric, making use of the notion of hyperbolic center of mass in the upper half-plane. It appears that our model compares favorably with existing reduction theories, at least in certain aspects related to the field of definition. Various tools and features of hyperbolic geometry that are interesting in themselves, but also relevant for our and various other reduction theories papers (\cite{julia} and \cite{SC}), are also treated in detail and in a self-contained way here.
title Reduction of binary forms via the hyperbolic center of mass
topic Metric Geometry
Number Theory
51F99
url https://arxiv.org/abs/1705.02618