Litcius/Paper detail

Hyperspectral Super-Resolution via Global–Local Low-Rank Matrix Estimation

Ruiyuan Wu, Wing-Kin Ma, Xiao Fu, Qiang Li

2020IEEE Transactions on Geoscience and Remote Sensing33 citationsDOIOpen Access PDF

Abstract

Hyperspectral super-resolution (HSR) is a problem that aims to estimate an image of high spectral and spatial resolutions from a pair of coregistered multispectral (MS) and hyperspectral (HS) images, which have coarser spectral and spatial resolutions, respectively. In this article, we pursue a lowrank matrix estimation approach for HSR. We assume that the spectral-spatial matrices associated with the whole image and the local areas of the image have low-rank structures. The local low-rank assumption, in particular, has the aim of providing a more flexible model for accounting for local variation effects due to endmember variability. We formulate the HSR problem as a global-local rank-regularized least-squares problem. By leveraging on the recent advances in nonconvex large-scale optimization, namely the smooth Schatten-p approximation and the accelerated majorization-minimization method, we develop an efficient algorithm for the global-local low-rank problem. Numerical experiments on synthetic, semi-real, and real data show that the proposed algorithm outperforms a number of benchmark algorithms in terms of recovery performance.

Topics & Concepts

Hyperspectral imagingEndmemberMultispectral imageComputer scienceBenchmark (surveying)Pattern recognition (psychology)Image (mathematics)AlgorithmArtificial intelligenceMatrix (chemical analysis)Full spectral imagingSpectral signatureMatrix decompositionRemote sensingImage resolutionEstimation theoryData modelingSynthetic dataMathematicsIterative reconstructionComputer visionEarth observationImage processingCovariance matrixImage segmentationEssential matrixAdvanced Image Fusion TechniquesSparse and Compressive Sensing TechniquesRemote-Sensing Image Classification