Title :
Upper Bounds on the Size of Grain-Correcting Codes
Author :
Kashyap, Nitesh ; Zemor, Gilles
Author_Institution :
Dept. of Electr. Commun. Eng., Indian Inst. of Sci., Bangalore, India
Abstract :
In this paper, we revisit the combinatorial error model of Mazumdar et al. that models errors in high-density magnetic recording caused by lack of knowledge of grain boundaries in the recording medium. We present new upper bounds on the cardinality/rate of binary block codes that correct errors within this model. All our bounds, except for one, are obtained using combinatorial arguments based on hypergraph fractional coverings. The exception is a bound derived via an information-theoretic argument. Our bounds significantly improve upon existing bounds from the prior literature.
Keywords :
binary codes; block codes; combinatorial mathematics; error correction codes; grain boundaries; magnetic recording; binary block codes; combinatorial arguments; combinatorial error model; grain boundaries; grain-correcting codes; high-density magnetic recording; hypergraph fractional coverings; information-theoretic argument; recording medium; Electronic mail; Hamming weight; Magnetic recording; Materials; Upper bound; Vectors; Writing; Fractional coverings; grain-correcting codes; high-density magnetic recording;
Journal_Title :
Information Theory, IEEE Transactions on
DOI :
10.1109/TIT.2014.2329008
