Shallow-water sparsity-cognizant source-location mapping

Forero, Pedro A.; Baxley, Paul A.

doi:10.1121/1.4874605

Cited by 25 publications

(24 citation statements)

References 37 publications

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“…In ocean acoustics, CS has found several applications in matched field processing 14,15 and in coherent passive fathometry for inferring sediment interfaces depths and their number 16 . Various wave propagation phenomena from a single source (refraction, diffraction, scattering, ducting, reflection) lead to multiple partially coherent arrivals received by the array.…”

Section: Introductionmentioning

confidence: 99%

Multiple and single snapshot compressive beamforming

Gerstoft

Xenaki

Mecklenbräuker

2015

The Journal of the Acoustical Society of America

206

110

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For a sound field observed on a sensor array, compressive sensing (CS) reconstructs the directionof-arrival (DOA) of multiple sources using a sparsity constraint. The DOA estimation is posed as an underdetermined problem by expressing the acoustic pressure at each sensor as a phaselagged superposition of source amplitudes at all hypothetical DOAs. Regularizing with an 1-norm constraint renders the problem solvable with convex optimization, and promoting sparsity gives highresolution DOA maps. Here, the sparse source distribution is derived using maximum a posteriori (MAP) estimates for both single and multiple snapshots. CS does not require inversion of the data covariance matrix and thus works well even for a single snapshot where it gives higher resolution than conventional beamforming. For multiple snapshots, CS outperforms conventional high-resolution methods, even with coherent arrivals and at low signal-to-noise ratio. The superior resolution of CS is demonstrated with vertical array data from the SWellEx96 experiment for coherent multi-paths.

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Section: Introductionmentioning

confidence: 99%

Multiple and single snapshot compressive beamforming

Gerstoft

Xenaki

Mecklenbräuker

2015

The Journal of the Acoustical Society of America

206

110

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“…. , F , in the regularizer are known to induce resilience to model mismatch into the estimateS(t) [8], [9]. From this vantage point, λ > 0 corresponds to the variance of a random perturbation affecting each replica, which depends on the mismatch between the true propagation environment and the model used to generate the replicas.…”

Section: Sparsity-driven Tracking Of Acoustic Sourcesmentioning

confidence: 99%

“…Note that both MFT and the proposed method fail to track the source after t = 65 min. due to the severe mismatch between the environment and the model used to generate the replicas (see [9]). …”

Section: Numerical Tests On Swellex-3mentioning

confidence: 99%

Sparsity-driven passive tracking of underwater acoustic sources

Forero¹,

Baxley²,

Straatemeier³

2015

OCEANS 2015 - Genova

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Tracking underwater acoustic sources using passive sonar is a challenging task due to the complex interactions that acoustic signals undergo as they propagate through the undersea environment. Notwithstanding these challenges, methods for tracking acoustic sources, which assume that acoustic environmental information is available, have been proposed. These methods are challenged by their high computational complexity and often do not exploit the temporal structure inherent to the tracking problem. This work proposes a sparsity-driven approach for tracking broadband acoustic sources. Source location maps (SLMs), one per frequency, are sequentially estimated while capturing the temporal dependance between successive SLMs. Coherence across the SLMs' support is enforced to guarantee that the source-location estimates are independent of frequency. An iterative solver based on the proximal gradient method is developed to construct the SLMs. Numerical examples on real data illustrate the performance of the proposed algorithm.

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“…Furthermore, in ocean acoustics, CS is shown to improve the performance of matched field processing, 8,9 which is a generalized beamforming method for localizing sources in complex environments (e.g., shallow water), and of coherent passive fathometry in inferring the number and depth of sediment layer interfaces. 10 One of the limitations of CS in DOA estimation is basis mismatch 11 which occurs when the sources do not coincide with the look directions due to inadequate discretization of the angular spectrum.…”

Section: Introductionmentioning

confidence: 99%

Grid-free compressive beamforming

Xenaki

Gerstoft

2015

The Journal of the Acoustical Society of America

130

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The direction-of-arrival (DOA) estimation problem involves the localization of a few sources from a limited number of observations on an array of sensors, thus it can be formulated as a sparse signal reconstruction problem and solved efficiently with compressive sensing (CS) to achieve high-resolution imaging. On a discrete angular grid, the CS reconstruction degrades due to basis mismatch when the DOAs do not coincide with the angular directions on the grid. To overcome this limitation, a continuous formulation of the DOA problem is employed and an optimization procedure is introduced, which promotes sparsity on a continuous optimization variable. The DOA estimation problem with infinitely many unknowns, i.e., source locations and amplitudes, is solved over a few optimization variables with semidefinite programming. The grid-free CS reconstruction provides high-resolution imaging even with non-uniform arrays, single-snapshot data and under noisy conditions as demonstrated on experimental towed array data.

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Shallow-water sparsity-cognizant source-location mapping

Cited by 25 publications

References 37 publications

Multiple and single snapshot compressive beamforming

Multiple and single snapshot compressive beamforming

Sparsity-driven passive tracking of underwater acoustic sources

Grid-free compressive beamforming

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