1 research outputs found
Robust Low-Rank Tensor Ring Completion
Low-rank tensor completion recovers missing entries based on different tensor
decompositions. Due to its outstanding performance in exploiting some
higher-order data structure, low rank tensor ring has been applied in tensor
completion. To further deal with its sensitivity to sparse component as it does
in tensor principle component analysis, we propose robust tensor ring
completion (RTRC), which separates latent low-rank tensor component from sparse
component with limited number of measurements. The low rank tensor component is
constrained by the weighted sum of nuclear norms of its balanced unfoldings,
while the sparse component is regularized by its l1 norm. We analyze the RTRC
model and gives the exact recovery guarantee. The alternating direction method
of multipliers is used to divide the problem into several sub-problems with
fast solutions. In numerical experiments, we verify the recovery condition of
the proposed method on synthetic data, and show the proposed method outperforms
the state-of-the-art ones in terms of both accuracy and computational
complexity in a number of real-world data based tasks, i.e., light-field image
recovery, shadow removal in face images, and background extraction in color
video