TY - JOUR
T1 - Coding for the ℓ∞-Limited Permutation Channel
AU - Langberg, Michael
AU - Schwartz, Moshe
AU - Yaakobi, Eitan
N1 - Publisher Copyright:
© 1963-2012 IEEE.
PY - 2017/12
Y1 - 2017/12
N2 - We consider the communication of information in the presence of synchronization errors. Specifically, we consider permutation channels in which a transmitted codeword x=(x1,..,xn) is corrupted by a permutation π Sn to yield the received word y=(y1,..,yn), where yi=xπ (i). We initiate the study of worst case (or zero-error) communication over permutation channels that distort the information by applying permutations π, which are limited to displacing any symbol by at most r locations, i.e., permutations π with weight at most r in the ℓmetric. We present direct and recursive constructions, as well as bounds on the rate of such channels for binary and general alphabets. Specific attention is given to the case of r=1.
AB - We consider the communication of information in the presence of synchronization errors. Specifically, we consider permutation channels in which a transmitted codeword x=(x1,..,xn) is corrupted by a permutation π Sn to yield the received word y=(y1,..,yn), where yi=xπ (i). We initiate the study of worst case (or zero-error) communication over permutation channels that distort the information by applying permutations π, which are limited to displacing any symbol by at most r locations, i.e., permutations π with weight at most r in the ℓmetric. We present direct and recursive constructions, as well as bounds on the rate of such channels for binary and general alphabets. Specific attention is given to the case of r=1.
KW - Permutation channel
KW - ℓ-metric
UR - http://www.scopus.com/inward/record.url?scp=85041752998&partnerID=8YFLogxK
U2 - 10.1109/TIT.2017.2762676
DO - 10.1109/TIT.2017.2762676
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AN - SCOPUS:85041752998
SN - 0018-9448
VL - 63
SP - 7676
EP - 7686
JO - IEEE Transactions on Information Theory
JF - IEEE Transactions on Information Theory
IS - 12
M1 - 8067503
ER -