El cos diferència i el cos de projecció en geometria convexa Authors Judit Abardia-Evéquoz Abstract In this paper we present some notions and classical results from convex geometry which have found numerous applications. We concentrate on three families of convex bodies: ellipsoids, centrally symmetric convex bodies and zonoids, and describe some of their applications in geometry. For instance, we prove Minkowski's first theorem on the geometry of numbers, the existence of an ellipsoid of maximal volume inside a convex body Âthe so-called John ellipsoid and study Shephard's problem, which asks if there are pairs of bodies one with a smaller volume than the other, but with larger projections. The centrally symmetric bodies and the zonoids are also described as the range of certain operators: the difference and projection operators. At the beginning of this paper we present the basic notions of convex geometry that will be used throughout and take a brief look at the combinatorial geometry, presenting Helly's theorem and some of its consequences. Downloads Text complet (Català) Published 2017-07-11 How to Cite Abardia-Evéquoz, J. (2017). El cos diferència i el cos de projecció en geometria convexa. Butlletí De La Societat Catalana De Matemàtiques, 32(1), 5–44. Retrieved from https://revistes.iec.cat/index.php/BSCM/article/view/96508.004 More Citation Formats ACM ACS APA ABNT Chicago Harvard IEEE MLA Turabian Vancouver Download Citation Endnote/Zotero/Mendeley (RIS) BibTeX Issue Vol. 32 No. 1 (2017) Section Articles License The intellectual property of articles belongs to the respective authors.On submitting articles for publication to the journal Butlletí de la Societat Catalana de Matemàtiques, authors accept the following terms:Authors assign to Societat Catalana de Matemàtiques (a subsidiary of Institut d’Estudis Catalans) the rights of reproduction, communication to the public and distribution of the articles submitted for publication to Butlletí de la Societat Catalana de Matemàtiques.Authors answer to Societat Catalana de Matemàtiques for the authorship and originality of submitted articles.Authors are responsible for obtaining permission for the reproduction of all graphic material included in articles.Societat Catalana de Matemàtiques declines all liability for the possible infringement of intellectual property rights by authors.The contents published in the journal, unless otherwise stated in the text or in the graphic material, are subject to a Creative Commons Attribution-NonCommercial-NoDerivs (by-nc-nd) 3.0 Spain licence, the complete text of which may be found at https://creativecommons.org/licenses/by-nc-nd/3.0/es/deed.en. Consequently, the general public is authorised to reproduce, distribute and communicate the work, provided that its authorship and the body publishing it are acknowledged, and that no commercial use and no derivative works are made of it.The journal Butlletí de la Societat Catalana de Matemàtiques is not responsible for the ideas and opinions expressed by the authors of the published articles.
