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Optimal Low-Degree Hardness of Maximum Independent Set

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arxiv 2010.06563 v2 pith:LFFKNRXT submitted 2020-10-13 cs.CC cs.DSmath.PRstat.ML

Optimal Low-Degree Hardness of Maximum Independent Set

classification cs.CC cs.DSmath.PRstat.ML
keywords independentalgorithmssizeclassfindhalf-optimalinftyknown
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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We study the algorithmic task of finding a large independent set in a sparse Erd\H{o}s-R\'{e}nyi random graph with $n$ vertices and average degree $d$. The maximum independent set is known to have size $(2 \log d / d)n$ in the double limit $n \to \infty$ followed by $d \to \infty$, but the best known polynomial-time algorithms can only find an independent set of half-optimal size $(\log d / d)n$. We show that the class of low-degree polynomial algorithms can find independent sets of half-optimal size but no larger, improving upon a result of Gamarnik, Jagannath, and the author. This generalizes earlier work by Rahman and Vir\'ag, which proved the analogous result for the weaker class of local algorithms.

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