Approximate Hypergraph Coloring under Low-discrepancy and Related Promises
Abstract
A hypergraph is said to be -colorable if its vertices can be colored with colors so that no hyperedge is monochromatic. -colorability is a fundamental property (called Property B) of hypergraphs and is extensively studied in combinatorics. Algorithmically, however, given a -colorable -uniform hypergraph, it is NP-hard to find a -coloring miscoloring fewer than a fraction of hyperedges (which is achieved by a random -coloring), and the best algorithms to color the hypergraph properly require colors, approaching the trivial bound of as increases. In this work, we study the complexity of approximate hypergraph coloring, for both the maximization (finding a -coloring with fewest miscolored edges) and minimization (finding a proper coloring using fewest number of colors) versions, when the input hypergraph is promised to have the following stronger properties than -colorability: (A) Low-discrepancy: If the hypergraph has discrepancy , we give an algorithm to color the it with colors. However, for the maximization version, we prove NP-hardness of finding a -coloring miscoloring a smaller than (resp. ) fraction of the hyperedges when (resp. ). Assuming the UGC, we improve the latter hardness factor to for almost discrepancy- hypergraphs. (B) Rainbow colorability: If the hypergraph has a -coloring such that each hyperedge is polychromatic with all these colors, we give a -coloring algorithm that miscolors at most of the hyperedges when , and complement this with a matching UG hardness result showing that when , it is hard to even beat the bound achieved by a random coloring.
Keywords
Cite
@article{arxiv.1506.06444,
title = {Approximate Hypergraph Coloring under Low-discrepancy and Related Promises},
author = {Vijay V. S. P. Bhattiprolu and Venkatesan Guruswami and Euiwoong Lee},
journal= {arXiv preprint arXiv:1506.06444},
year = {2015}
}
Comments
Approx 2015