Using higher-order Fourier analysis over general fields

Abstract

Higher-order Fourier analysis, developed over prime fields, has been recently used in different areas of computer science, including list decoding, algorithmic decomposition and testing. We extend the tools of higher-order Fourier analysis to analyze functions over general fields. Using these new tools, we revisit the results in the above areas. * For any fixed finite field K, we show that the list decoding radius of the generalized Reed Muller code over K equals the minimum distance of the code. Previously, this had been proved over prime fields [BL14] and for the case when |K|-1 divides the order of the code [GKZ08]. * For any fixed finite field K, we give a polynomial time algorithm to decide whether a given polynomial P: Kn K can be decomposed as a particular composition of lesser degree polynomials. This had been previously established over prime fields [Bha14, BHT15]. * For any fixed finite field K, we prove that all locally characterized affine-invariant properties of functions f: Kn K are testable with one-sided error. The same result was known when K is prime [BFHHL13] and when the property is linear [KS08]. Moreover, we show that for any fixed finite field F, an affine-invariant property of functions f: Kn F, where K is a growing field extension over F, is testable if it is locally characterized by constraints of bounded weight.