English

Derandomized Graph Product Results using the Low Degree Long Code

Computational Complexity 2020-05-08 v2

Abstract

In this paper, we address the question of whether the recent derandomization results obtained by the use of the low-degree long code can be extended to other product settings. We consider two settings: (1) the graph product results of Alon, Dinur, Friedgut and Sudakov [GAFA, 2004] and (2) the "majority is stablest" type of result obtained by Dinur, Mossel and Regev [SICOMP, 2009] and Dinur and Shinkar [In Proc. APPROX, 2010] while studying the hardness of approximate graph coloring. In our first result, we show that there exists a considerably smaller subgraph of K3RK_3^{\otimes R} which exhibits the following property (shown for K3RK_3^{\otimes R} by Alon et al.): independent sets close in size to the maximum independent set are well approximated by dictators. The "majority is stablest" type of result of Dinur et al. and Dinur and Shinkar shows that if there exist two sets of vertices AA and BB in K3RK_3^{\otimes R} with very few edges with one endpoint in AA and another in BB, then it must be the case that the two sets AA and BB share a single influential coordinate. In our second result, we show that a similar "majority is stablest" statement holds good for a considerably smaller subgraph of K3RK_3^{\otimes R}. Furthermore using this result, we give a more efficient reduction from Unique Games to the graph coloring problem, leading to improved hardness of approximation results for coloring.

Keywords

Cite

@article{arxiv.1411.3517,
  title  = {Derandomized Graph Product Results using the Low Degree Long Code},
  author = {Irit Dinur and Prahladh Harsha and Srikanth Srinivasan and Girish Varma},
  journal= {arXiv preprint arXiv:1411.3517},
  year   = {2020}
}
R2 v1 2026-06-22T06:57:34.620Z