研究成果

Superpixel-based Multitask Learning Framework for Hyperspectral Image Classification

期刊名称: IEEE Transactions on Geoscience and Remote Sensing
全部作者: Sen Jia,Bin Deng,Jiasong Zhu*,Xiuping Jia,Qingquan Li
出版年份: 2017
卷       号: 55
期       号: 5
页       码: 2575-2588
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Due to the high spectral dimensionality of hyperspectral images as well as the difficult and time-consuming process of collecting sufficient labeled samples in practice, the small sample size scenario is one crucial problem and a challenging issue for hyperspectral image classification. Fortunately, the structure information of materials, reflecting region of homogeneity in the spatial domain, offers an invaluable complement to the spectral information. Assuming some spatial regularity and locality of surface materials, it is reasonable to segment the image into different homogeneous parts in advance, called superpixel, which can be used to improve the classification performance. In this paper, a superpixel-based multitask learning framework has been proposed for hyperspectral image classification. Specifically, a set of 2-D Gabor filters are first applied to hyperspectral images to extract discriminative features. Meanwhile, a superpixel map is generated from the hyperspectral images. Second, a superpixel-based spatial-spectral Schroedinger eigenmaps ((SE)-E-4) method is adopted to effectively reduce the dimensions of each extracted Gabor cube. Finally, the classification is carried out by a support vector machine (SVM)-based multitask learning framework. The proposed approach is thus termed Gabor (SE)-E-4 and SVM-based multitask learning (GS(4)E-MTLSVM). A series of experiments is conducted on three real hyperspectral image data sets to demonstrate the effectiveness of the proposed GS(4)E-MTLSVM approach. The experimental results show that the performance of the proposed GS(4)E-MTLSVM is better than those of several state-of- the-art methods, while the computational complexity has been greatly reduced, compared with the pixel-based spatial-spectral Schroedinger eigenmaps method.