Optimal Non-Adaptive Tolerant Junta Testing via Local Estimators
Abstract
We give a non-adaptive algorithm that makes 2O(k(1/2 - 1)) queries to a Boolean function f:\ 1\n → \ 1\ and distinguishes between f being 1-close to some k-junta versus 2-far from every k-junta. At the heart of our algorithm is a local mean estimation procedure for Boolean functions that may be of independent interest. We complement our upper bound with a matching lower bound, improving a recent lower bound obtained by Chen et al. We thus obtain the first tight bounds for a natural property of Boolean functions in the tolerant testing model.
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