2023 Help me understand this report
Improved NP-Hardness of Approximation for Orthogonality Dimension and Minrank
Abstract: The orthogonality dimension of a graph G over R is the smallest integer k for which one can assign a nonzero k-dimensional real vector to each vertex of G, such that every two adjacent vertices receive orthogonal vectors. We prove that for every sufficiently large integer k, it is NP-hard to decide whether the orthogonality dimension of a given graph over R is at most k or at least 2 (1−o(1))•k/2 . We further prove such hardness results for the orthogonality dimension over finite fields as well as for the clos…
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