Litcius/Paper detail

Tensor-based basis function learning for three-dimensional sound speed fields

Lei Cheng, Xingyu Ji, Hangfang Zhao, Jianlong Li, Wen Xu

2022The Journal of the Acoustical Society of America29 citationsDOIOpen Access PDF

Abstract

Basis function learning is the stepping stone towards effective three-dimensional (3D) sound speed field (SSF) inversion for various acoustic signal processing tasks, including ocean acoustic tomography, underwater target localization/tracking, and underwater communications. Classical basis functions include the empirical orthogonal functions (EOFs), Fourier basis functions, and their combinations. The unsupervised machine learning method, e.g., the K-singular value decomposition (K-SVD) algorithm, has recently tapped into the basis function design, showing better representation performance than the EOFs. However, existing methods do not consider basis function learning approaches that treat 3D SSF data as a third-order tensor, and, thus, cannot fully utilize the 3D interactions/correlations therein. To circumvent such a drawback, basis function learning is linked to tensor decomposition in this paper, which is the primary drive for recent multi-dimensional data mining. In particular, a tensor-based basis function learning framework is proposed, which can include the classical basis functions (using EOFs and/or Fourier basis functions) as its special cases. This provides a unified tensor perspective for understanding and representing 3D SSFs. Numerical results using the South China Sea 3D SSF data have demonstrated the excellent performance of the tensor-based basis functions.

Topics & Concepts

Basis functionBasis (linear algebra)Orthogonal basisComputer scienceTensor (intrinsic definition)Empirical orthogonal functionsSingular value decompositionRadial basis functionOrthogonal functionsInversion (geology)Function (biology)AlgorithmArtificial intelligenceMathematicsMachine learningArtificial neural networkMathematical analysisGeometryPhysicsGeologyStructural basinBiologyQuantum mechanicsPaleontologyEvolutionary biologyTensor decomposition and applicationsComputational Physics and Python ApplicationsUnderwater Acoustics Research