Fooling Gaussian PTFs via Local Hyperconcentration

Abstract

We give a pseudorandom generator that fools degree-d polynomial threshold functions over n-dimensional Gaussian space with seed length poly(d)· n. All previous generators had a seed length with at least a 2d dependence on d. The key new ingredient is a Local Hyperconcentration Theorem, which shows that every degree-d Gaussian polynomial is hyperconcentrated almost everywhere at scale d-O(1).