中文

A 4.509-Approximation Algorithm for Generalized Min Sum Set Cover

数据结构与算法 2026-05-12 v1

摘要

We study the \emph{generalized min-sum set cover} (GMSSC) problem, where given a collection of hyperedges EE with arbitrary covering requirements {keZ+:eE}\{k_e \in \mathbb{Z}^+ : e \in E\}, the objective is to find an ordering of the vertices that minimizes the total cover time of the hyperedges. A hyperedge ee is considered covered at the first time when kek_e of its vertices appear in the ordering. We present a 4.5094.509-approximation algorithm for GMSSC, improving upon the previous best-known guarantee of 4.6424.642~\cite[SODA'21]{BansalBFT21}. Our approach retains the general LP-based framework of Bansal, Batra, Farhadi, and Tetali~\cite{BansalBFT21} but provides an improved analysis that narrows the gap toward the lower bound of 44-approximation assuming P\neqNP. Our analysis takes advantage of the constraints of the linear program in a nontrivial way, along with new lower-tail bounds for the sums of independent Bernoulli random variables, which could be of independent interest.

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引用

@article{arxiv.2605.10031,
  title  = {A 4.509-Approximation Algorithm for Generalized Min Sum Set Cover},
  author = {Amey Bhangale and Yezhou Zhang},
  journal= {arXiv preprint arXiv:2605.10031},
  year   = {2026}
}