Title :
Compact representation of multidimensional data using tensor rank-one decomposition
Author :
Wang, Hongcheng ; Ahuja, Narendra
Author_Institution :
Beckman Inst., Illinois Univ., Champaign, IL, USA
Abstract :
This paper presents a new approach for representing multidimensional data by a compact number of bases. We consider the multidimensional data as tensors instead of matrices or vectors, and propose a tensor rank-one decomposition (TROD) algorithm by decomposing Nth-order data into a collection of rank-1 tensors based on multilinear algebra. By applying this algorithm to image sequence compression, we obtain much higher quality images with the same compression ratio as principal component analysis (PCA). Experiments with gray-level and color video sequences are used to illustrate the validity of this approach.
Keywords :
data compression; data structures; image coding; image sequences; matrix decomposition; principal component analysis; tensors; PCA; color video sequences; compression ratio; gray level sequences; image sequence compression; multidimensional data representation; multilinear algebra; principal component analysis; rank-1 tensors; tensor rank one decomposition algorithm; Multidimensional systems; Pattern recognition; Tensile stress;
Conference_Titel :
Pattern Recognition, 2004. ICPR 2004. Proceedings of the 17th International Conference on
Print_ISBN :
0-7695-2128-2
DOI :
10.1109/ICPR.2004.1334001
