Generalized Robust Shrinkage Estimator and Its Application to STAP Detection Problem

Pascal, Frédéric; Chitour, Yacine; Quek, Yihui

doi:10.1109/tsp.2014.2355779

Cited by 109 publications

(124 citation statements)

References 33 publications

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“…the regularized Tyler's M -estimator with β = 1 − α. This existence and uniqueness of the regularized Tyler's M -estimator for this case, i.e., when β = 1 − α, has also been established in [21], but only under the condition that the data are in general position and hence Conditions A and B are automatically satisfied for such samples. A related regularized M -Tyler's estimator is given in [3] as the limit of the algorithm…”

Section: A) If Condition a Holds Then (6) Has A Unique Minimum In H(mentioning

confidence: 67%

“…Condition (8) implies Tr(Σ −1 ) = p(1 − β)/α and hence the choice β = 1 is excluded. If we choose β = 1 − α above, then the estimator Σ satisfies the constraint Tr(Σ −1 ) = p. Hereafter, when using this estimator, we assume without loss of generality that n * = n. This case β = 1 − α has been previously studied in [21].…”

Section: Regularized M -Estimators Of Scatter Matrixmentioning

confidence: 99%

“…Our general conditions do not apply to the cost function corresponding to Tyler's [24] M -estimator and hence this estimator is treated seperately, with necessary and sufficient conditions being established to ensure the uniqueness of solution for the penalized Tyler's cost function. Regularized versions of Tyler's M -estimator have also been recently studied in [21] for the case β = 1 − α and under more strict conditions on the sample, and also in [3], but not in the context as a solution to a penalized M -estimation cost function. Estimation of the regularization parameters using the expected likelihood approach was proposed in [1], [2] for the regularized Tyler's M -estimator of [3], whereas [5] based their analysis on random matrix theory (both n and p are large).…”

mentioning

confidence: 99%

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Regularized <formula formulatype="inline"><tex Notation="TeX">$M$</tex> </formula>-Estimators of Scatter Matrix

Ollila

Tyler

2014

IEEE Trans. Signal Process.

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Abstract-In this paper, a general class of regularized Mestimators of scatter matrix are proposed which are suitable also for low or insufficient sample support (small n and large p) problems. The considered class constitutes a natural generalization of M -estimators of scatter matrix (Maronna, 1976) and are defined as a solution to a penalized M -estimation cost function that depend on a pair (α, β) of regularization parameters. We derive general conditions for uniqueness of the solution using concept of geodesic convexity. Since these conditions do not include Tyler's M -estimator, necessary and sufficient conditions for uniqueness of the penalized Tyler's cost function are established separately. For the regularized Tyler's M -estimator, we also derive a simple, closed form and data dependent solution for choosing the regularization parameter based on shape matrix matching in the mean squared sense. An iterative algorithm that converges to the solution of the regularized M -estimating equation is also provided. Finally, some simulations studies illustrate the improved accuracy of the proposed regularized M -estimators of scatter compared to their non-regularized counterparts in low sample support problems. An example of radar detection using normalized matched filter (NMF) illustrate that an adaptive NMF detector based on regularized M -estimators are able to maintain accurately the preset CFAR level and at at the same time provide similar probability of detection as the (theoretical) NMF detector.

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Section: A) If Condition a Holds Then (6) Has A Unique Minimum In H(mentioning

confidence: 67%

Section: Regularized M -Estimators Of Scatter Matrixmentioning

confidence: 99%

mentioning

confidence: 99%

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Regularized <formula formulatype="inline"><tex Notation="TeX">$M$</tex> </formula>-Estimators of Scatter Matrix

Ollila

Tyler

2014

IEEE Trans. Signal Process.

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“…• The Shrinkage-FPE (SFPE), also known as DiagonnalyLoaded FPE [16][17] [18], defined for β ∈]0, 1] by the fixed point equation:…”

Section: CM and Clutter Subspace Estimatorsmentioning

confidence: 99%

Numerical performances of low rank stap based on different heterogeneous clutter subspace estimators

Breloy

Ginolhac

Pascal

et al. 2014

2014 International Radar Conference

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Space time Adaptive Processing (STAP) for airborne RADAR fits the context of a disturbance composed of a Low Rank (LR) clutter, here modeled by a Compound Gaussian (CG) process, plus a white Gaussian noise (WGN). In such context, the corresponding LR adaptive filters used to detect a target require less training vectors than classical methods to reach equivalent performance. Unlike the classical filter which is based on the Covariance Matrix (CM) of the noise, the LR filter is based on the clutter subspace projector, which is usually derived from a Singular Value Decomposition (SVD) of a noise CM estimate. Regarding to the considered model of LR-CG plus WGN, recent results are providing both direct estimators of the clutter subspace [1][2] and an exact MLE of the noise CM [3]. To promote the use of these new estimation methods, this paper proposes to apply them to realistic STAP simulations.

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“…When dealing with real-world data, the presence of impulsive noise and outliers [3], [4], [5], [6], [7] must also be accounted for. Recently, the MM-Lasso and adaptive MMLasso were introduced to robustify against outliers [8].…”

Section: Introductionmentioning

confidence: 99%

The outlier-corrected-data-adaptive Lasso: A new robust estimator for the independent contamination model

Machkour

Alt

Muma

et al. 2017

2017 25th European Signal Processing Conference (EUSIPCO)

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Abstract-Many of today's signal processing tasks consider sparse models where the number of explanatory variables exceeds the sample size. When dealing with real-world data, the presence of impulsive noise and outliers must also be accounted for. Accurate and robust parameter estimation and consistent variable selection are needed simultaneously. Recently, some popular robust methods have been adapted to such complex settings. Especially, in high dimensional settings, however, it is possible to have a single contaminated predictor being responsible for many outliers. The amount of outliers introduced by this predictor easily exceeds the breakdown point of any existing robust estimator. Therefore, we propose a new robust and sparse estimator, the Outlier-Corrected-Data-(Adaptive) Lasso (OCD-(A) Lasso). It simultaneously handles highly contaminated predictors in the dataset and performs well under the classical contamination model. In a numerical study, it outperforms competing Lasso estimators, at a largely reduced computational complexity compared to its robust counterparts.

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Generalized Robust Shrinkage Estimator and Its Application to STAP Detection Problem

Cited by 109 publications

References 33 publications

Regularized <formula formulatype="inline"><tex Notation="TeX">$M$</tex> </formula>-Estimators of Scatter Matrix

Regularized <formula formulatype="inline"><tex Notation="TeX">$M$</tex> </formula>-Estimators of Scatter Matrix

Numerical performances of low rank stap based on different heterogeneous clutter subspace estimators

The outlier-corrected-data-adaptive Lasso: A new robust estimator for the independent contamination model

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