Title :
Codes in Permutations and Error Correction for Rank Modulation
Author :
Barg, Alexander ; Mazumdar, Arya
fDate :
7/1/2010 12:00:00 AM
Abstract :
Codes for rank modulation have been recently proposed as a means of protecting flash memory devices from errors. We study basic coding theoretic problems for such codes, representing them as subsets of the set of permutations of n elements equipped with the Kendall tau distance. We derive several lower and upper bounds on the size of codes. These bounds enable us to establish the exact scaling of the size of optimal codes for large values of n. We also show the existence of codes whose size is within a constant factor of the sphere packing bound for any fixed number of errors.
Keywords :
error correction; error correction codes; modulation coding; Kendall tau distance; coding theoretic problem; error correction; flash memory device; optimal codes; permutation; rank modulation; sphere packing bound; Aging; Error correction codes; Flash memory; Functional analysis; Hamming distance; Modulation coding; Protection; Statistics; Upper bound; Writing; Bose–Chowla theorem; Kendall tau distance; flash memory; inversion; rank permutation codes;
Journal_Title :
Information Theory, IEEE Transactions on
DOI :
10.1109/TIT.2010.2048455
