中文

Threshold Rounding and Bounded-Degree Boolean MAX 2-CSP

数据结构与算法 2026-07-13 v1

摘要

We describe an Ω~(1/d4)\widetilde{\Omega}(1/d^4)-improvement over threshold rounding schemes for a broad class of Boolean MAX 2-CSP instances in which every variable appears in at most dd constraints. In the case of MAX 2-SAT, we improve the ratio further and obtain an (β+Ω~(1/d2))(\beta_\star + \widetilde{\Omega}(1/d^2))-factor approximation algorithm for bounded-degree MAX 2-SAT instances, where β\beta_\star is the UGC-optimal approximation ratio for MAX 2-SAT achieved by the LLZ algorithm. Our result generalizes an (αGW+Ω~(1/d2))(\alpha_{GW} + \widetilde{\Omega}(1/d^2))-factor approximation algorithm for MAX CUT on graphs with degrees bounded by dd, due to Hsieh and Kothari. Together with the state-of-the-art approximability results for MAX DI-CUT and MAX 2-AND, our result suggests that similar improvements exist for bounded-degree instances of these problems as well.

引用

@article{arxiv.2607.11050,
  title  = {Threshold Rounding and Bounded-Degree Boolean MAX 2-CSP},
  author = {Suprovat Ghoshal and Neng Huang and Euiwoong Lee and Konstantin Makarychev and Yury Makarychev},
  journal= {arXiv preprint arXiv:2607.11050},
  year   = {2026}
}

备注

To appear in APPROX 26