Lower Bounds for Maximally Recoverable Tensor Code and Higher Order MDS Codes

Abstract: An (m, n, a, b)-tensor code consists of m × n matrices whose columns satisfy 'a' parity checks and rows satisfy 'b' parity checks (i.e., a tensor code is the tensor product of a column code and row code). Tensor codes are useful in distributed storage because a single erasure can be corrected quickly either by reading its row or column. Maximally Recoverable (MR) Tensor Codes, introduced by Gopalan et al. [GHK + 17], are tensor codes which can correct every erasure pattern that is information theoretically pos… Show more