A 4.509-Approximation Algorithm for Generalized Min Sum Set Cover

Abstract

We study the generalized min-sum set cover (GMSSC) problem, where given a collection of hyperedges E with arbitrary covering requirements \ke ∈ Z+ : e ∈ E\, the objective is to find an ordering of the vertices that minimizes the total cover time of the hyperedges. A hyperedge e is considered covered at the first time when ke of its vertices appear in the ordering. We present a 4.509-approximation algorithm for GMSSC, improving upon the previous best-known guarantee of 4.642~[SODA'21]BansalBFT21. Our approach retains the general LP-based framework of Bansal, Batra, Farhadi, and Tetali~BansalBFT21 but provides an improved analysis that narrows the gap toward the lower bound of 4-approximation assuming P≠NP. 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.