Searching for Regularity in Bounded Functions

Abstract

Given a function f on F2n, we study the following problem. What is the largest affine subspace U such that when restricted to U, all the non-trivial Fourier coefficients of f are very small? For the natural class of bounded Fourier degree d functions f:F2n [-1,1], we show that there exists an affine subspace of dimension at least (n1/d!k-2), wherein all of f's nontrivial Fourier coefficients become smaller than 2-k. To complement this result, we show the existence of degree d functions with coefficients larger than 2-d n when restricted to any affine subspace of dimension larger than (dn1/(d-1)). In addition, we give explicit examples of functions with analogous but weaker properties. Along the way, we provide multiple characterizations of the Fourier coefficients of functions restricted to subspaces of F2n that may be useful in other contexts. Finally, we highlight applications and connections of our results to parity kill number and affine dispersers.

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