A Novel Symmetric Four Dimensional Polytope Found Using Optimization Strategies Inspired by Thomson’s Problem of Charges on a Sphere
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URI: http://arxiv.org/abs/physics/0601139URI: http://hdl.handle.net/10317/593
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Física AplicadaSponsors
We thank Andrew M. Gleason for helpful discussions. A.P.G. would like to acknowledge financial support from spanish MCyT under grant No. MAT2003–04887.Publication date
2006Bibliographic Citation
ALTSCHULER, E. L., PÉREZ GARRIDO, A., STONG, R. A Novel Symmetric Four Dimensional Polytope Found Using Optimization Strategies Inspired by Thomson’s Problem of Charges on a Sphere[en línea]. Disponible en: http://www.citebase.org/abstract?id=oai:arXiv.org:physics/0601139Keywords
Problema de ThomsonEsferas
Cuatro dimensiones
Estrategias de optimización
Abstract
Inspired by, and using methods of optimization derived from classical three dimensional electrostatics, we note a novel beautiful symmetric four dimensional polytope we have found with 80 vertices. We also describe how the method used to find this symmetric polytope, and related
methods can potentially be used to find good examples for the kissing and packing problems in D dimensions.
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