Low-Degree Fourier Threshold for Random Boolean Functions

Abstract

We study whether a uniformly random Boolean function f : \-1,1\p \-1,1\ is determined by its Walsh--Fourier coefficients of degree at most d. We show that the threshold lies at p/2 up to an O(p p) window: if \[ d p2 - p2( p + ω(1)), \] then with probability 1-o(1) there exists another Boolean function g f with the same degree- d coefficients. Conversely, for every fixed η ∈ (0,1), if \[ d p2 + p26pη2, \] then with probability at least 1-2-p, the function f is uniquely determined by its degree- d coefficients, even among all bounded functions g : \-1,1\p [-1,1]. This resolves a question of Vershynin.