Testing the Independent Set Property in Hypergraphs

Abstract

The optimal sample complexity of testing if an n-vertex graph has an independent set of size ρn, or is -far from having an independent set of size ρn, was established to be O(ρ3/2), in a notable result by Blais and Seth (SICOMP 2025). In contrast, for q-uniform hypergraphs, there is a significant gap between the best known upper and lower bounds, and there has been no progress on the problem for the last two decades. In this work, we prove a new upper bound of O\!(qρ2q-32 (q-2)!2) on the sample complexity of testing the ρ-independent set property. The previous best known upper bound was O\!(2q q! ρ2q3), due to Langberg (RANDOM 2004). This establishes the optimal dependence on and gives an exponential improvement in the dependence on q. We prove our result via a new application of the hypergraph container method.

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