On Unique Games with Negative Weights
Computational Complexity
2013-03-15 v4
Abstract
In this paper, the author defines Generalized Unique Game Problem (GUGP), where weights of the edges are allowed to be negative. Two special types of GUGP are illuminated, GUGP-NWA, where the weights of all edges are negative, and GUGP-PWT(), where the total weight of all edges are positive and the negative-positive ratio is at most . The author investigates the counterpart of the Unique Game Conjecture on GUGP-PWT(). The author shows that Unique Game Conjecture on GUGP-PWT(1) holds true, and Unique Game Conjecture on GUGP-PWT(1/2) holds true, if the 2-to-1 Conjecture holds true. The author poses an open problem whether Unique Game Conjecture holds true on GUGP-PWT() with .
Cite
@article{arxiv.1102.5605,
title = {On Unique Games with Negative Weights},
author = {Peng Cui},
journal= {arXiv preprint arXiv:1102.5605},
year = {2013}
}
Comments
7 pages, accepted by COCOA 2011