Computing a k-sparse n-length Discrete Fourier Transform using at most 4k samples and O(k log k) complexity

Given an n-length input signal x, it is well known that its Discrete Fourier Transform (DFT), X, can be computed in O(nlogn) complexity using a Fast Fourier Transform. If the spectrum X is exactly k-sparse (where k <;<; n), can we do better? We show that asymptotically in k and n, when k is sub-linear in n (i.e., k ∝ nδ where 0 <; δ <; 1), and the support of the non-zero DFT coefficients is uniformly random, we can exploit this sparsity in two fundamental ways (i) sample complexity: we need only M = rk deterministically chosen samples of the input signal x (where r <; 4 when 0 <; δ <; 0.99); and (ii) computational complexity: we can reliably compute the DFT X using O(k log k) operations, where the constants in the big Oh are small. Our algorithm succeeds with high probability, with the probability of failure vanishing to zero asymptotically in the number of samples acquired, M. Our approach is based on filterless subsampling of the input signal x using a small set of carefully chosen uniform subsampling patterns guided by the Chinese Remainder Theorem (CRT). Specifically, our subsampling operation on x is designed to create aliasing patterns on the spectrum X that "look like" parity-check constraints of good erasure-correcting sparse-graph codes. We show how computing the sparse DFT X is equivalent to decoding of these sparse-graph codes and is low in both sample complexity and decoding complexity. We accordingly dub our algorithm the FFAST (Fast Fourier Aliasing-based Sparse Transform) algorithm. In our analysis, we rigorously connect our CRT based graph constructions to random sparse-graph codes based on a balls-and-bins model and analyze the convergence behavior of the latter using well-studied density evolution techniques from coding theory. We provide simulation results in Section IV that corroborate our theoretical findings, and validate the empirical performance of the FFAST algorithm.

• Publication year

  2013

• Venue

  2013 IEEE International Symposium on Information Theory

• Publication date

  2013-05-03

• Fields of study

  Mathematics, Computer Science

• Identifiers
  DOI 10.1109/ISIT.2013.6620269arXiv 1305.0870
• External record

  Open on Semantic Scholar

• Source metadata

  Semantic Scholar

• No claims are published for this paper.

• No concepts are published for this paper.

• A robust R-FFAST framework for computing a k-sparse n-length DFT in O(k log n) sample complexity using sparse-graph codes

  2014influential reference
• PhaseCode: Fast and efficient compressive phase retrieval based on sparse-graph codes

  2014cited by this paper
• Improved bounds on Restricted isometry for compressed sensing

  2013cited by this paper
• Sample-optimal average-case sparse Fourier Transform in two dimensions

  2013cited by this paper
• A Fast Hadamard Transform for Signals With Sublinear Sparsity in the Transform Domain

  2013cited by this paper
• Nearly optimal sparse fourier transform

  2012cited by this paper
• A hybrid DFT-LDPC framework for fast, efficient and robust compressive sensing

  2012cited by this paper
• Simple and practical algorithm for sparse Fourier transform

  2012cited by this paper
• (1 + eps)-Approximate Sparse Recovery

  2011cited by this paper
• (1 + eps)-Approximate Sparse Recovery

  2011influential reference
• Lower bounds for sparse recovery

  2010influential reference
• Combinatorial Sublinear-Time Fourier Algorithms

  2010cited by this paper
• From Theory to Practice: Sub-Nyquist Sampling of Sparse Wideband Analog Signals

  2009cited by this paper
• A Tutorial on Fast Fourier Sampling

  2008cited by this paper
• Sparse Sampling of Signal Innovations

  2008influential reference
• Empirical evaluation of a sub-linear time sparse DFT algorithm

  2007cited by this paper
• Signal Recovery From Random Measurements Via Orthogonal Matching Pursuit

  2007cited by this paper
• Sampling Moments and Reconstructing Signals of Finite Rate of Innovation: Shannon Meets Strang–Fix

  2007cited by this paper
• Improved time bounds for near-optimal sparse Fourier representations

  2005influential reference
• Probability and Computing: Randomized Algorithms and Probabilistic Analysis

  2005cited by this paper
• Low-Density Parity-Check Codes

  2004influential reference
• Near-Optimal Signal Recovery From Random Projections: Universal Encoding Strategies?

  2004cited by this paper
• Robust uncertainty principles: exact signal reconstruction from highly incomplete frequency information

  2004cited by this paper
• Fast and accurate single frequency estimator

  2004cited by this paper
• Near-optimal sparse fourier representations via sampling

  2002cited by this paper
• Verification Codes : Simple Low-Density Parity-Check Codes for Large Alphabets

  2002cited by this paper
• Sampling signals with finite rate of innovation

  2002cited by this paper
• Improved low-density parity-check codes using irregular graphs

  2001cited by this paper
• Efficient erasure correcting codes

  2001cited by this paper
• The capacity of low-density parity-check codes under message-passing decoding

  2001cited by this paper
• A digital fountain approach to reliable distribution of bulk data

  1998cited by this paper
• ESPRIT-estimation of signal parameters via rotational invariance techniques

  1989influential reference
• Multiple emitter location and signal Parameter estimation

  1986cited by this paper
• Fast algorithms for digital signal processing

  1986cited by this paper
• Self-sorting mixed-radix fast Fourier transforms

  1983cited by this paper
• The Retrieval of Harmonics from a Covariance Function

  1973influential reference

• Adaptive Sparse M\"obius Transforms for Learning Polynomials

  2026cites this paper
• SPEX: Scaling Feature Interaction Explanations for LLMs

  2025cites this paper
• Learning to Understand: Identifying Interactions via the Mobius Transform

  2024cites this paper
• Linear-depth quantum circuits for loading Fourier approximations of arbitrary functions

  2023cites this paper
• MIT Open Access

  2022cites this paper
• Two Efficient Sparse Fourier Algorithms Using the Matrix Pencil Method

  2022cites this paper
• Performance of the Multiscale Sparse Fast Fourier Transform Algorithm

  2022influential citation
• A Coded Compressed Sensing Scheme for Unsourced Multiple Access

  2020cites this paper
• On Performance of Sparse Fast Fourier Transform Algorithms Using the Aliasing Filter.

  2020cites this paper
• On Performance of Multiscale Sparse Fast Fourier Transform Algorithm

  2020cites this paper
• On Performance of Sparse Fast Fourier Transform Algorithms Using the Flat Window Filter

  2020cites this paper
• Selecting FFT Word Length for an OFDM Receiver That Supports Undersampling

  2020cites this paper
• Empirical Evaluation of Typical Sparse Fast Fourier Transform Algorithms

  2020cites this paper
• Sparse-Encoded Codebook Index Modulation

  2020cites this paper
• A fast DFT method for generally k sparse signals recovery

  2019cites this paper
• Dimension-independent Sparse Fourier Transform

  2019cites this paper
• Vector Space and Matrix Methods in Signal and System Theory

  2019cites this paper
• Sparse NOMA: A Closed-Form Characterization

  2018cites this paper
• Computation of Loss Distribution Based on the Structural Model for Credit Portfolios

  2018cites this paper
• Sparse fast DCT for vectors with one-block support

  2018cites this paper
• Fast Fourier Transforms

  2018cites this paper
• A Coded Compressed Sensing Scheme for Uncoordinated Multiple Access

  2018cites this paper
• Leaving Randomness to Nature : d-Dimensional Product Codes through the lens of Generalized-LDPC codes

  2018cites this paper
• Compressive Sensing Matrix Design for Fast Encoding and Decoding via Sparse FFT

  2018cites this paper
• A Coupled Compressive Sensing Scheme for Uncoordinated Multiple Access

  2018influential citation
• An adaptive sublinear-time block sparse fourier transform

  2017cites this paper
• Sparsity-based fast CGH generation using layer-based approach for 3D point cloud model

  2017influential citation
• PhaseCode: Fast and Efficient Compressive Phase Retrieval Based on Sparse-Graph Codes

  2017cites this paper
• Density evolution on a class of smeared random graphs

  2017influential citation
• Sample Efficient Estimation and Recovery in Sparse FFT via Isolation on Average

  2017cites this paper
• HRS: A Robust Compressed Sensing Arithmetic in Wireless Equipment Acoustic Signal Test

  2017cites this paper
• Rake, Peel, Sketch - The Signal Processing Pipeline Revisited

  2017influential citation
• Time-data trade-off in the sparse Fourier transform

  2017influential citation
• Sparse fast Fourier transform for exactly sparse signals and signals with additive Gaussian noise

  2017cites this paper
• Deterministic sparse FFT for M-sparse vectors

  2017cites this paper
• Sparse OFDM: A Compressive Sensing Approach to Asynchronous Neighbor Discovery

  2017cites this paper
• FFT and sparse FFT techniques and applications

  2017cites this paper
• Sparse FFT for Functions with Short Frequency Support

  2017cites this paper
• High-Performance Sparse Fourier Transform on Parallel Architectures

  2016cites this paper
• Fast sparse 2-D DFT computation using sparse-graph alias codes

  2016influential citation
• A generalized LDPC framework for robust and sublinear compressive sensing

  2016cites this paper
• The Sparse Fourier Transform

  2016cites this paper
• A sparse fast Fourier algorithm for real non-negative vectors

  2016cites this paper
• Peeling Decoding of LDPC Codes with Applications in Compressed Sensing

  2016cites this paper
• Sparse fourier transform in any constant dimension with nearly-optimal sample complexity in sublinear time

  2016cites this paper
• Adaptive compression ratio estimation for categorified sparsity in real-time ECG monitoring system

  2016cites this paper
• Time Delay Estimation via Co-Prime Aliased Sparse FFT

  2016cites this paper
• Optimal reception of sub-sampled time-domain sparse signals in wired/wireless OFDM transceivers

  2016cites this paper
• A sparse multidimensional FFT for real positive vectors

  2016cites this paper
• Sparse covariance estimation based on sparse-graph codes

  2015cites this paper
• Fast and robust compressive phase retrieval with sparse-graph codes

  2015cites this paper
• A deterministic sparse FFT algorithm for vectors with small support

  2015cites this paper
• A robust sub-linear time R-FFAST algorithm for computing a sparse DFT

  2015influential citation
• SAFFRON: A fast, efficient, and robust framework for group testing based on sparse-graph codes

  2015cites this paper
• Sub-linear Time Compressed Sensing for Support Recovery using Sparse-Graph Codes

  2015cites this paper
• Fast and Efficient Sparse 2D Discrete Fourier Transform using Sparse-Graph Codes

  2015influential citation
• Exploring connections between Sparse Fourier Transform computation and decoding of product codes

  2015cites this paper
• Robust Sparse Walsh-Hadamard Transform : The SPRIGHT Algorithm

  2015cites this paper
• SPRIGHT: A Fast and Robust Framework for Sparse Walsh-Hadamard Transform

  2015influential citation
• Computationally-efficient sparse polynomial interpolation

  2015cites this paper
• Robust sublinear complexity Walsh-Hadamard transform with arbitrary sparse support

  2015cites this paper
• Phase Retrieval: An Overview of Recent Developments

  2015cites this paper
• A Combinatorial Aliasing-Based Sparse Fourier Transform

  2015cites this paper
• Deterministic sparse FFT algorithms

  2015cites this paper
• Sparse Fast Fourier Transform for Exactly and Generally K-Sparse Signals by Downsampling and Sparse Recovery

  2014cites this paper
• PhaseCode: Fast and efficient compressive phase retrieval based on sparse-graph codes

  2014cites this paper
• Sample-Optimal Fourier Sampling in Any Constant Dimension

  2014cites this paper
• (Nearly) Sample-Optimal Sparse Fourier Transform

  2014cites this paper
• Sub-Linear Time Support Recovery for Compressed Sensing Using Sparse-Graph Codes

  2014cites this paper
• A robust R-FFAST framework for computing a k-sparse n-length DFT in O(k log n) sample complexity using sparse-graph codes

  2014cites this paper
• The SPRIGHT algorithm for robust sparse Hadamard Transforms

  2014cites this paper
• GHz-wide sensing and decoding using the sparse Fourier transform

  2014cites this paper
• Compressed Sensing of Memoryless Sources - A Deterministic Hadamard Construction

  2014influential citation
• Automatic generation of behavioral hard disk drive access time models

  2014cites this paper
• Robustifying the Sparse Walsh-Hadamard Transform without Increasing the Sample Complexity of O ( K log N )

  2014cites this paper
• Recent Developments in the Sparse Fourier Transform: A compressed Fourier transform for big data

  2014cites this paper
• Sparse recovery and Fourier sampling

  2013cites this paper
• Computationally-efficient blind sub-Nyquist sampling for sparse spectra

  2013cites this paper
• Parallel sparse FFT

  2013influential citation
• A Fast Hadamard Transform for Signals With Sublinear Sparsity in the Transform Domain

  2013cites this paper
• A fast Hadamard transform for signals with sub-linear sparsity

  2013influential citation
• Sample-optimal average-case sparse Fourier Transform in two dimensions

  2013cites this paper