Unified greedy approximability beyond submodular maximization
Abstract
We consider classes of objective functions of cardinality constrained maximization problems for which the greedy algorithm guarantees a constant approximation. We propose the new class of --augmentable functions and prove that it encompasses several important subclasses, such as functions of bounded submodularity ratio, -augmentable functions, and weighted rank functions of an independence system of bounded rank quotient - as well as additional objective functions for which the greedy algorithm yields an approximation. For this general class of functions, we show a tight bound of on the approximation ratio of the greedy algorithm that tightly interpolates between bounds from the literature for functions of bounded submodularity ratio and for -augmentable functions. In paritcular, as a by-product, we close a gap left in [Math.Prog., 2020] by obtaining a tight lower bound for -augmentable functions for all . For weighted rank functions of independence systems, our tight bound becomes , which recovers the known bound of for independence systems of rank quotient at least .
Cite
@article{arxiv.2011.00962,
title = {Unified greedy approximability beyond submodular maximization},
author = {Yann Disser and David Weckbecker},
journal= {arXiv preprint arXiv:2011.00962},
year = {2022}
}