Forbidding Exactly One Hamming Distance
Abstract
Addressing questions raised in recent papers, we study the r-distance graph Hr(n) on the Boolean cube \0,1\n, where two vertices are adjacent if their Hamming distance is exactly r. For fixed integers s 2 and even r 2, we determine the asymptotic order of the s-independence number αs(Hr(n)), showing that \[ αs(Hr(n))=(2nnr/2). \] The upper bound is derived via a reduction to extremal problems for sunflower-free set systems, while the lower bound is obtained using algebraic constructions based on BCH codes and constant-weight codes.
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