Optimally Perturbed Identity Matrices of Rank 2
Abstract
The problem of optimal antipodal codes can be framed as finding low rank Gram matrices G with Gii = 1 and |Gij| ≤ ε for 1 ≤ i ≠ j ≤ n. In 2018, Bukh and Cox introduced a new bounding technique by removing the condition that G be a gram matrix. In this work, we investigate how tight this relaxation is, and find exact results for real valued matrices of rank 2.
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