Most Juntas Saturate the Hardcore Lemma
Abstract
Consider a function that is mildly hard for size-s circuits. For sufficiently large s, Impagliazzo's hardcore lemma guarantees a constant-density subset of inputs on which the same function is extremely hard for circuits of size s'<\!\!<s. Blanc, Hayderi, Koch, and Tan [FOCS 2024] recently showed that the degradation from s to s' in this lemma is quantitatively tight in certain parameter regimes. We give a simpler and more general proof of this result in almost all parameter regimes of interest by showing that a random junta witnesses the tightness of the hardcore lemma with high probability.
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