中文

Strong Inapproximability for a Promise Rank Problem

计算复杂性 2026-05-13 v1

摘要

Given a linear subspace of n×nn \times n matrices over F2r\mathbb F_{2^r} that is promised to contain a matrix of rank 11, we prove that it is hard to find a matrix of rank no(1/loglogn)n^{o(1/\log \log n)}, assuming NP doesn't have sub-exponential algorithms. In addition to being a basic problem, the hardness of this problem, even for the exact version, drove recent PCP-free inapproximability results for minimum distance and shortest vector problems concerning codes and lattices. The proof combines the concept of superposition soundness introduced by Khot and Saket with moment matrices. To produce a rank-gap of 11 vs. kk, the reduction runs in time nO(logk)n^{O(\log k)}. We also give another moment-matrix-based construction which runs in time nO(k)n^{O(k)} but works for any finite field Fq\mathbb F_q.

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引用

@article{arxiv.2605.11545,
  title  = {Strong Inapproximability for a Promise Rank Problem},
  author = {Venkatesan Guruswami and Xuandi Ren and Shaoxuan Tang},
  journal= {arXiv preprint arXiv:2605.11545},
  year   = {2026}
}