Random CNFs are Hard for Cutting Planes
نویسندگان
چکیده
The random k-SAT model is the most important and well-studied distribution over k-SAT instances. It is closely connected to statistical physics; it is used as a testbench for satisfiablity algorithms, and lastly average-case hardness over this distribution has also been linked to hardness of approximation via Feige’s hypothesis. In this paper, we prove that any Cutting Planes refutation for random k-SAT requires exponential size, for k that is logarithmic in the number of variables, and in the interesting regime where the number of clauses guarantees that the formula is unsatisfiable with high probability.
منابع مشابه
Random Θ(log n)-CNFs Are Hard for Cutting Planes
The random k-SAT model is the most important and well-studied distribution over k-SAT instances. It is closely connected to statistical physics and is a benchmark for satisfiability algorithms. We show that when k = Θ(log n), any Cutting Planes refutation for random k-SAT requires exponential size in the interesting regime where the number of clauses guarantees that the formula is unsatisfiable...
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عنوان ژورنال:
- Electronic Colloquium on Computational Complexity (ECCC)
دوره 24 شماره
صفحات -
تاریخ انتشار 2017