Low-rank matrix completion and cellular automaton modelling for interpolation

In this paper, we propose a low-rank matrix completion and cellular automaton model to effectively exploit the nonlocal inter-pixel correlation for image interpolation and enhancement applications. Different from tasks such as image denoising, in image interpolation and colour demosaicking, the many visually unpleasant artefacts (for example, ringing effects and zipper artefacts) are generally fine scale structures and lead to small singular values of the data matrix, and therefore, we propose to use L0-norm, instead of the relaxed L1-norm, to regularise the singular values so that the fine scale artefacts can be effectively removed without affecting the large-scale image edges. The entire framework can be applied for extended matrix arrangement. We also incorporate a cellular automaton model with inter-pixel correlations and extend it for image interpolation. Experimental results show that the proposed method produces reasonably good results as compared with state-of-the-arts in terms of both peak signal-to-noise ratio measure and subjective visual quality.

[1]  Emmanuel J. Candès,et al.  The Power of Convex Relaxation: Near-Optimal Matrix Completion , 2009, IEEE Transactions on Information Theory.

[2]  Rabab Kreidieh Ward,et al.  A New Orientation-Adaptive Interpolation Method , 2007, IEEE Transactions on Image Processing.

[3]  Jean-Michel Morel,et al.  Self-Similarity Driven Color Demosaicking , 2009, IEEE Transactions on Image Processing.

[4]  Yizhen Huang,et al.  Super-resolution using neural networks based on the optimal recovery theory , 2006, 2006 16th IEEE Signal Processing Society Workshop on Machine Learning for Signal Processing.

[5]  Alessandro Foi,et al.  Image Denoising by Sparse 3-D Transform-Domain Collaborative Filtering , 2007, IEEE Transactions on Image Processing.

[6]  Lei Zhang,et al.  Color demosaicking by local directional interpolation and nonlocal adaptive thresholding , 2011, J. Electronic Imaging.

[7]  Stanley Osher,et al.  A Low Patch-Rank Interpretation of Texture , 2013, SIAM J. Imaging Sci..

[8]  Stanley Osher,et al.  Deblurring and Denoising of Images by Nonlocal Functionals , 2005, Multiscale Model. Simul..

[9]  R. Keys Cubic convolution interpolation for digital image processing , 1981 .

[10]  Lei Zhang,et al.  An edge-guided image interpolation algorithm via directional filtering and data fusion , 2006, IEEE Transactions on Image Processing.

[11]  Emmanuel J. Candès,et al.  Exact Matrix Completion via Convex Optimization , 2008, Found. Comput. Math..

[12]  Yizhen Huang,et al.  Image Based Source Camera Identification using Demosaicking , 2006, 2006 IEEE Workshop on Multimedia Signal Processing.

[13]  Zuowei Shen,et al.  Robust video denoising using low rank matrix completion , 2010, 2010 IEEE Computer Society Conference on Computer Vision and Pattern Recognition.

[14]  Hsieh Hou,et al.  Cubic splines for image interpolation and digital filtering , 1978 .

[15]  Wei Chen,et al.  Nonlocal low-rank matrix completion for image interpolation using edge detection and neural network , 2014, Signal Image Video Process..

[16]  Stéphane Mallat,et al.  Super-Resolution With Sparse Mixing Estimators , 2010, IEEE Transactions on Image Processing.

[17]  Xiangjun Zhang,et al.  Image Interpolation by Adaptive 2-D Autoregressive Modeling and Soft-Decision Estimation , 2008, IEEE Transactions on Image Processing.

[18]  Emmanuel J. Candès,et al.  A Singular Value Thresholding Algorithm for Matrix Completion , 2008, SIAM J. Optim..

[19]  Jean-Michel Morel,et al.  A non-local algorithm for image denoising , 2005, 2005 IEEE Computer Society Conference on Computer Vision and Pattern Recognition (CVPR'05).

[20]  Yizhen Huang,et al.  Demosaicking recognition with applications in digital photo authentication based on a quadratic pixel correlation model , 2008, 2008 IEEE Conference on Computer Vision and Pattern Recognition.

[21]  Yuan Zhang,et al.  Adaptive color image watermarking based on the just noticeable distortion model in balanced multiwavelet domain , 2011, J. Electronic Imaging.