On the largest subsets avoiding the diameter of (0, 1)-vectors
Abstract
Let Lmkl⊂ Rm+k+l be the set of vectors which have m of entries -1, k of entries 0, and l of entries 1. In this paper, we investigate the largest subset of Lmkl whose diameter is smaller than that of Lmkl. The largest subsets for m=1, l=2, and any k will be classified. From this result, we can classify the largest 4-distance sets containing the Euclidean representation of the Johnson scheme J(9,4). This was an open problem in Bannai, Sato, and Shigezumi (2012).
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