Hyperspectral Image Restoration Via Total Variation Regularized Low-Rank Tensor Decomposition

Wang, Yao; Peng, Jiangjun; Zhao, Qian; Leung, Yee; Zhao, Xi-Le; Meng, Deyu

doi:10.1109/jstars.2017.2779539

Cited by 323 publications

(188 citation statements)

References 49 publications

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“…µ can be initially set as 10 −2 and updated in each iteration by µ := min(ηµ, µ max ), where η = 1.1. As introduced in [45], [47], [48], γ can be set as 100/ √ I 1 I 2 . In our experiences, α is selected in a range from 0 to 0.2 and β can be chosen between 0 to 10.…”

Section: B Parameter Selectionmentioning

confidence: 99%

Multipass SAR Interferometry Based on Total Variation Regularized Robust Low Rank Tensor Decomposition

Kang

Wang

Zhu

2020

IEEE Trans. Geosci. Remote Sensing

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This is the pre-acceptance version, to read the final version, please go to IEEE Transactions on Geoscience and Remote Sensing on IEEE Xplore. Multipass SAR interferometry (InSAR) techniques based on meter-resolution spaceborne SAR satellites, such as TerraSAR-X or COSMO-Skymed, provide 3D reconstruction and the measurement of ground displacement over large urban areas. Conventional method such as Persistent Scatterer Interferometry (PSI) usually requires a fairly large SAR image stack (usually in the order of tens), in order to achieve reliable estimates of these parameters. Recently, low rank property in multipass InSAR data stack was explored and investigated in our previous work [1]. By exploiting this low rank prior, more accurate estimation of the geophysical parameters can be achieved, which in turn can effectively reduce the number of interferograms required for a reliable estimation. Based on that, this paper proposes a novel tensor decomposition method in complex domain, which jointly exploits low rank and variational prior of the interferometric phase in InSAR data stacks. Specifically, a total variation (TV) regularized robust low rank tensor decomposition method is exploited for recovering outlier-free InSAR stacks. We demonstrate that the filtered InSAR data stacks can greatly improve the accuracy of geophysical parameters estimated from real data. Moreover, this paper demonstrates for the first time in the community that tensor-decomposition-based methods can be beneficial for large-scale urban mapping problems using multipass InSAR. Two TerraSAR-X data stacks with large spatial areas demonstrate the promising performance of the proposed method.

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Section: B Parameter Selectionmentioning

confidence: 99%

Multipass SAR Interferometry Based on Total Variation Regularized Robust Low Rank Tensor Decomposition

Kang

Wang

Zhu

2020

IEEE Trans. Geosci. Remote Sensing

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“…Before introducing PMLSA, we consider how to obtain −1 j in (5). For the univariate model Y j = XB j +E j , Koenker [23] indicated that the asymptotic covariance of the estimationB j has the common property…”

Section: A Modelsmentioning

confidence: 99%

Unified Low-Rank Matrix Estimate via Penalized Matrix Least Squares Approximation

Chang

Zhong

Wang

et al. 2019

IEEE Trans. Neural Netw. Learning Syst.

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Low-rank matrix estimation arises in a number of statistical and machine learning tasks. In particular, the coefficient matrix is considered to have a low-rank structure in multivariate linear regression and multivariate quantile regression. In this paper, we propose a method called penalized matrix least squares approximation (PMLSA) toward a unified yet simple low-rank matrix estimate. Specifically, PMLSA can transform many different types of low-rank matrix estimation problems into their asymptotically equivalent least-squares forms, which can be efficiently solved by a popular matrix fast iterative shrinkage-thresholding algorithm. Furthermore, we derive analytic degrees of freedom for PMLSA, with which a Bayesian information criterion (BIC)-type criterion is developed to select the tuning parameters. The estimated rank based on the BIC-type criterion is verified to be asymptotically consistent with the true rank under mild conditions. Extensive experimental studies are performed to confirm our assertion.

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“…In particular, multi-dimensional arrays (i.e., tensors) provide a natural representation form for these data. Tensor, which is regarded as a multi-linear generalization of matrix/vector, can mathematically model the multi-dimensional data structures, making tensor learning so attractive that there are increasing applications in computer vision [1][2][3][4], machine learning [5,6], signal processing [7,8], and pattern recognition [9] in recent years. Unfortunately, the challenge of missing elements in the actually observed tensors limits its applications.…”

Section: Introductionmentioning

confidence: 99%

“…Obviously, the difference among the existing LRTC models mainly lies in the choice of f . Although various tensor rank surrogates [3,6,18] are proposed to approximate the tensor rank, they all face some challenges in practical applications. According to the CP decomposition [15], Friedland et al [18] claimed that the CP-rank could be relaxed it with CP tensor nuclear norm (CNN), which is a convex surrogate that can be defined as:…”

Section: Introductionmentioning

confidence: 99%

Tensor p-shrinkage nuclear norm for low-rank tensor completion

2020

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In this paper, a new definition of tensor p-shrinkage nuclear norm (p-TNN) is proposed based on tensor singular value decomposition (t-SVD). In particular, it can be proved that p-TNN is a better approximation of the tensor average rank than the tensor nuclear norm when −∞ < p < 1. Therefore, by employing the p-shrinkage nuclear norm, a novel low-rank tensor completion (LRTC) model is proposed to estimate a tensor from its partial observations. Statistically, the upper bound of recovery error is provided for the LRTC model. Furthermore, an efficient algorithm, accelerated by the adaptive momentum scheme, is developed to solve the resulting nonconvex optimization problem. It can be further guaranteed that the algorithm enjoys a global convergence rate under the smoothness assumption. Numerical experiments conducted on both synthetic and real-world data sets verify our results and demonstrate the superiority of our p-TNN in LRTC problems over several state-of-the-art methods.

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Hyperspectral Image Restoration Via Total Variation Regularized Low-Rank Tensor Decomposition

Cited by 323 publications

References 49 publications

Multipass SAR Interferometry Based on Total Variation Regularized Robust Low Rank Tensor Decomposition

Multipass SAR Interferometry Based on Total Variation Regularized Robust Low Rank Tensor Decomposition

Unified Low-Rank Matrix Estimate via Penalized Matrix Least Squares Approximation

Tensor p-shrinkage nuclear norm for low-rank tensor completion

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