摘要
In this paper, claims by Lemmens and Seidel in 1973 about equiangular sets of lines with angle 1∕5 are proved by carefully analyzing pillar decomposition, with the aid of the uniqueness of two-graphs on 276 vertices. The Neumann Theorem is generalized in the sense that if there are more than 2r−2 equiangular lines in Rr, then the angle is quite restricted. Together with techniques on finding saturated equiangular sets, we determine the maximum size of equiangular sets “exactly” in an r-dimensional Euclidean space for r=8, 9, and 10.
原文 | ???core.languages.en_GB??? |
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文章編號 | 111667 |
期刊 | Discrete Mathematics |
卷 | 343 |
發行號 | 2 |
DOIs | |
出版狀態 | 已出版 - 2月 2020 |