TY - JOUR
T1 - Non-Local Robust Quaternion Matrix Completion for Large-Scale Color Image and Video Inpainting
AU - Jia, Zhigang
AU - Jin, Qiyu
AU - Ng, Michael K.
AU - Zhao, Xi Le
N1 - This work was supported in part by the National Natural Science Foundation of China under Grant 12171210, Grant 12090011, Grant 11771188, Grant 61876203, Grant 12171072, and Grant 12061052; in part by the Hong Kong Research Grant Council (HKRGC) under Grant GRF 12300218, Grant 12300519, Grant 17201020, Grant 17300021, Grant C1013-21GF, Grant C7004-21GF, and Grant Joint NSFC-RGC N-HKU76921; in part by the Major Projects of Universities in Jiangsu Province under Grant 21KJA11001; in part by the Priority Academic Program Development Project (PAPD) and the Top-Notch Academic k.Programs Project of Jiangsu Higher Education Institutions under Grant PPZY2015A013; in part by the Applied Basic Research Project of Sichuan Province under Grant 2021YJ0107; in part by the Key Project of Applied Basic Research in Sichuan Province under Grant 2020YJ0216; in part by the National Key Research and Development Program of China under Grant 2020YFA0714001; in part by the Natural Science Fund of Inner Mongolia Autonomous Region under Grant 2020MS01002; in part by the Young Talents of Science and Technology in Universities of Inner Mongolia Autonomous Region under Grant NJYT22090; and in part by the Innovative Research Team in Universities of Inner Mongolia Autonomous Region under Grant NMGIRT2207.
Publisher Copyright:
© 1992-2012 IEEE.
PY - 2022/5/26
Y1 - 2022/5/26
N2 - The image nonlocal self-similarity (NSS) prior refers to the fact that a local patch often has many nonlocal similar patches to it across the image and has been widely applied in many recently proposed machining learning algorithms for image processing. However, there is no theoretical analysis on its working principle in the literature. In this paper, we discover a potential causality between NSS and low-rank property of color images, which is also available to grey images. A new patch group based NSS prior scheme is proposed to learn explicit NSS models of natural color images. The numerical low-rank property of patched matrices is also rigorously proved. The NSS-based QMC algorithm computes an optimal low-rank approximation to the high-rank color image, resulting in high PSNR and SSIM measures and particularly the better visual quality. A new tensor NSS-based QMC method is also presented to solve the color video inpainting problem based on quaternion tensor representation. The numerical experiments on color images and videos indicate the advantages of NSS-based QMC over the state-of-the-art methods.
AB - The image nonlocal self-similarity (NSS) prior refers to the fact that a local patch often has many nonlocal similar patches to it across the image and has been widely applied in many recently proposed machining learning algorithms for image processing. However, there is no theoretical analysis on its working principle in the literature. In this paper, we discover a potential causality between NSS and low-rank property of color images, which is also available to grey images. A new patch group based NSS prior scheme is proposed to learn explicit NSS models of natural color images. The numerical low-rank property of patched matrices is also rigorously proved. The NSS-based QMC algorithm computes an optimal low-rank approximation to the high-rank color image, resulting in high PSNR and SSIM measures and particularly the better visual quality. A new tensor NSS-based QMC method is also presented to solve the color video inpainting problem based on quaternion tensor representation. The numerical experiments on color images and videos indicate the advantages of NSS-based QMC over the state-of-the-art methods.
KW - color image inpainting
KW - color video
KW - Low-rank approximation
KW - nonlocal self-similarity
KW - quaternion singular value decomposition
UR - http://www.scopus.com/inward/record.url?scp=85131271103&partnerID=8YFLogxK
U2 - 10.1109/TIP.2022.3176133
DO - 10.1109/TIP.2022.3176133
M3 - Journal article
C2 - 35617180
AN - SCOPUS:85131271103
SN - 1057-7149
VL - 31
SP - 3868
EP - 3883
JO - IEEE Transactions on Image Processing
JF - IEEE Transactions on Image Processing
ER -