Title :
Tensor codes for the rank metric
Author_Institution :
Dept. of Comput. Sci., Technion-Israel Inst. of Technol., Haifa, Israel
fDate :
11/1/1996 12:00:00 AM
Abstract :
Linear spaces of n×n×n tensors over finite fields are investigated where the rank of every nonzero tensor in the space is bounded from below by a prescribed number μ. Such linear spaces can recover any n×n×n error tensor of rank ⩽ (μ-1)/2, and, as such, they can be used to correct three-way crisscross errors. Bounds on the dimensions of such spaces are given for μ⩽2n+1, and constructions are provided for μ⩽2n-1 with redundancy which is linear in n. These constructions can be generalized to spaces of n×n×...×n hyper-arrays
Keywords :
error correction codes; matrix algebra; redundancy; tensors; constructions; finite fields; hyper-arrays; linear spaces; n×n×n error tensor; n×n×n tensors; nonzero tensor; rank metric; redundancy; tensor codes; three-way crisscross errors; Computer science; Erbium; Information theory; Linear code; Linear matrix inequalities; Materials science and technology; Tensile stress; Vectors;
Journal_Title :
Information Theory, IEEE Transactions on
