Fast Fourier Sparsity Testing

Abstract

A function f : F2n R is s-sparse if it has at most s non-zero Fourier coefficients. Motivated by applications to fast sparse Fourier transforms over F2n, we study efficient algorithms for the problem of approximating the 2-distance from a given function to the closest s-sparse function. While previous works (e.g., Gopalan et al. SICOMP 2011) study the problem of distinguishing s-sparse functions from those that are far from s-sparse under Hamming distance, to the best of our knowledge no prior work has explicitly focused on the more general problem of distance estimation in the 2 setting, which is particularly well-motivated for noisy Fourier spectra. Given the focus on efficiency, our main result is an algorithm that solves this problem with query complexity O(s) for constant accuracy and error parameters, which is only quadratically worse than applicable lower bounds.