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Hyperspectral images (HSI) are often corrupted by noise making their analysis and interpretation difficult. In this paper we develop a sparse low rank model for HSI, which is useful for denoising. The two key benefits of the model for denoising are dimensionality reduction via noisy principal component analysis (nPCA) and the exploitation of sparse-ness in the dual-tree complex wavelet transform (CWT)...
This paper deals with hyperspectral image reconstruction using a new linear model and Sparse Regularization (SR). The new model is based on Principal Components (PCs) and wavelets. Since the hyperspectral PCs are not spatially sparse, wavelet is applied to get spatially sparse representation. Sparse regularization is used to recover the corrupted signal. The regularization parameter is chosen by Stein's...
Principal Component Analysis (PCA) has widely been used in hyperspectral image analysis as a preprocessing step for further processing. Recently, sparse PCA methods have emerged as a powerful alternative. In this paper we propose a wavelet based sparse PCA method for hyperspectral image denoising. The proposed method is evaluated by using simulated and real data.
In this paper, a new denoising method for hyperspectral images using First Order Roughness Penalty (FORP) is proposed. The proposed algorithm is applied in the wavelet domain to exploit the multiresolution analysis property of wavelets and thus improving the denoising results. Stein's Unbiased Risk Estimator (SURE) is used to choose the tuning parameters automatically. The experimental results show...
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