Dependent rounding with strong negative-correlation, and scheduling on unrelated machines to minimize completion time

TL;DR

This paper introduces a new dependent-rounding algorithm with strong negative correlation properties, enabling improved approximation algorithms for scheduling jobs on unrelated machines to minimize total completion time.

Contribution

The paper presents a novel dependent-rounding framework based on negatively correlated exponential variables, achieving stronger negative correlation and improving approximation ratios for scheduling problems.

Findings

Achieved a 1.398-approximation for unrelated machine scheduling.

Developed a flexible dependent-rounding scheme with strong negative correlation.

Improved the approximation ratio from 1.45 to 1.398.

Abstract

We describe a new dependent-rounding algorithmic framework for bipartite graphs. Given a fractional assignment $\vec x$ of values to edges of graph $G = (U \cup V, E)$, the algorithms return an integral solution $\vec X$ such that each right-node $v \in V$ has at most one neighboring edge $f$ with $X_f = 1$, and the variables $X_e$ also satisfy broad nonpositive-correlation properties. In particular, for any edges $e_1, e_2$ sharing a left-node $u \in U$, the variables $X_{e_1}, X_{e_2}$ have strong negative correlation, i.e. the expectation of $X_{e_1} X_{e_2}$ is significantly below $x_{e_1} x_{e_2}$. This algorithm is based on generating negatively-correlated Exponential random variables and using them in a contention-resolution scheme inspired by an algorithm Im & Shadloo (2020). Our algorithm gives stronger and much more flexible negative correlation properties. Dependent rounding schemes with negative correlation properties have been used for approximation algorithms for job-scheduling on unrelated machines to minimize weighted completion times (Bansal, Srinivasan, & Svensson (2021), Im & Shadloo (2020), Im & Li (2023)). Using our new dependent-rounding algorithm, among other improvements, we obtain a $1.398$-approximation for this problem. This significantly improves over the prior $1.45$-approximation ratio of Im & Li (2023).