Title :
The hardness of decoding linear codes with preprocessing
Author :
Bruck, Jehoshua ; Naor, Moni
Author_Institution :
IBM Res. Div., San Jose, CA, USA
fDate :
3/1/1990 12:00:00 AM
Abstract :
The problem of maximum-likelihood decoding of linear block codes is known to be hard. The fact that the problem remains hard even if the code is known in advance, and can be preprocessed for as long as desired in order to device a decoding algorithm, is shown. The hardness is based on the fact that existence of a polynomial-time algorithm implies that the polynomial hierarchy collapses. Thus, some linear block codes probably do not have an efficient decoder. The proof is based on results in complexity theory that relate uniform and nonuniform complexity classes
Keywords :
decoding; error correction codes; complexity theory; error correcting codes; hardness; linear block codes; maximum-likelihood decoding; polynomial-time algorithm; preprocessing; Block codes; Circuits; Equations; Hamming weight; Linear code; Maximum likelihood decoding; Parity check codes; Polynomials; Vectors; Zinc;
Journal_Title :
Information Theory, IEEE Transactions on
