Wang, Yi2012-11-272012-11-272012-08https://hdl.handle.net/11299/139778University of Minnesota Ph.D. dissertation. August 2012. Major: Mathematics. Advisor: Gilad Lerman. 1 computer file (PDF); vii, 63 pages.Hybrid Linear Modeling (HLM) uses a set of affine subspaces to model data and has been widely used in computer vision. However, many segmentation algorithms need to know d and K as a priori. Therefore, determining the dimension d and the number K of subspaces is an important problem in HLM. In this manuscript, we suggest two automatic ways to empirically find d and K. One obtains local estimation of the dimension by examining the geometric structure of a neighborhood. The other finds K or both d and K by detecting the "elbow" of the least square error. We provide a partial justification of the elbow method for special cases. We also demonstrate the accuracy and speed of our methods on synthetic and real hybrid linear data. Another challenge in HLM is to deal with highly corrupted data. We study the related problems of denoising images corrupted by impulsive noise and blind inpainting (i.e., inpainting when the deteriorated region is unknown). Our basic approach is to model the set of patches of pixels in an image as a union of low dimensional subspaces, corrupted by sparse but perhaps large magnitude noise. For this purpose, we develop a robust and iterative method for single subspace modeling and extend it to an iterative algorithm for modeling multiple subspaces. We prove convergence for both algorithms and carefully compare our methods with other recent ideas for such robust modeling. We demonstrate state of the art performance of our method for both imaging problems.en-USBlind inpaintingHybrid linear modelingImpulsive noiseLow rankSparsityRobust hybrid linear modeling and its applications.Thesis or Dissertation