Title :
Compressive recovery of 2-D off-grid frequencies
Author :
Yuejie Chi ; Yuxin Chen
Author_Institution :
Dept. of Electr. & Comput. Eng., Ohio State Univ., Columbus, OH, USA
Abstract :
Estimation of two-dimensional frequencies arises in many applications such as radar, inverse scattering, and wireless communications. In this paper, we consider retrieving continuous-valued two-dimensional frequencies in a mixture of r complex sinusoids from a random subset of its n regularly-spaced timedomain samples. We formulate an atomic norm minimization program that, with high probability, guarantees perfect recovery from O(r log r log n) samples under a mild frequency separation condition. We propose to solve the atomic norm minimization via semidefinite programming, and validate the proposed algorithm via numerical examples. Our work extends the framework proposed by Tang et. al. [1] for line spectrum estimation to multidimensional spectrum estimation.
Keywords :
estimation theory; mathematical programming; minimisation; radar detection; wireless channels; 2D off-grid frequency; atomic norm minimization; complex sinusoids; compressive recovery; continuous-valued frequency; inverse scattering; line spectrum estimation; mild frequency separation; multidimensional spectrum estimation; radar; random subset; regularly-spaced time domain samples; semidefinite programming; two-dimensional frequency; wireless communications; Atomic clocks; Compressed sensing; Discrete Fourier transforms; Minimization; Radar; Sparse matrices; Wireless communication; atomic norm; basis mismatch; continuous-valued frequency recovery; nonparametric; sparsity;
Conference_Titel :
Signals, Systems and Computers, 2013 Asilomar Conference on
Conference_Location :
Pacific Grove, CA
Print_ISBN :
978-1-4799-2388-5
DOI :
10.1109/ACSSC.2013.6810370
