Tighter Hard Instances for PPSZ
Abstract
We construct uniquely satisfiable -CNF formulas that are hard for the algorithm PPSZ. Firstly, we construct graph-instances on which "weak PPSZ" has savings of at most ; the saving of an algorithm on an input formula with variables is the largest such that the algorithm succeeds (i.e. finds a satisfying assignment) with probability at least . Since PPSZ (both weak and strong) is known to have savings of at least , this is optimal up to the constant factor. In particular, for , our upper bound is , which is fairly close to the lower bound of Hertli [SIAM J. Comput.'14]. We also construct instances based on linear systems over for which strong PPSZ has savings of at most . This is only a factor away from the optimal bound. Our constructions improve previous savings upper bound of due to Chen et al. [SODA'13].
Keywords
Cite
@article{arxiv.1611.01291,
title = {Tighter Hard Instances for PPSZ},
author = {Pavel Pudlák and Dominik Scheder and Navid Talebanfard},
journal= {arXiv preprint arXiv:1611.01291},
year = {2017}
}