(Nearly) sample-optimal sparse fourier transform

Author(s)

Indyk, Piotr; Kapralov, Mikhail; Price, Eric C

Abstract

We consider the problem of computing a k-sparse approximation to the discrete Fourier transform of an n-dimensional signal. Our main result is a randomized algorithm that computes such an approximation using O(k log n(log log n)[superscript O(1)]) signal samples in time O(k log[superscript 2] n(log log n)[superscript O(1)]), assuming that the entries of the signal are polynomially bounded. The sampling complexity improves over the recent bound of O(k log n log(n/k)) given in [15], and matches the lower bound of Ω(k log(n/k)/log log n) from the same paper up to poly(log log n) factors when k = O(n[superscript 1-δ]) for a constant δ > 0.

Date issued

2014-01

URI

http://hdl.handle.net/1721.1/114162

Department

Massachusetts Institute of Technology. Department of Electrical Engineering and Computer Science

Journal

SODA '14 Proceedings of the twenty-fifth annual ACM-SIAM symposium on Discrete algorithms

Publisher

Association for Computing Machinery

Citation

Indyk, Piotr, Michael Kapralov, and Eric Price. "(Nearly) Sample-Optimal Sparse Fourier Transform." SODA '14 Proceedings of the Twenty-fifth Annual ACM-SIAM Symposium on Discrete Algorithms, 5-7 January, 2014, Pittsburgh, Pennsylvania, Association for Computing Machinery, 2014.

Version: Original manuscript