English

Constructions of Rank Modulation Codes

Information Theory 2011-10-13 v1 math.IT

Abstract

Rank modulation is a way of encoding information to correct errors in flash memory devices as well as impulse noise in transmission lines. Modeling rank modulation involves construction of packings of the space of permutations equipped with the Kendall tau distance. We present several general constructions of codes in permutations that cover a broad range of code parameters. In particular, we show a number of ways in which conventional error-correcting codes can be modified to correct errors in the Kendall space. Codes that we construct afford simple encoding and decoding algorithms of essentially the same complexity as required to correct errors in the Hamming metric. For instance, from binary BCH codes we obtain codes correcting tt Kendall errors in nn memory cells that support the order of n!/(log2n!)tn!/(\log_2n!)^t messages, for any constant t=1,2,...t= 1,2,... We also construct families of codes that correct a number of errors that grows with nn at varying rates, from Θ(n)\Theta(n) to Θ(n2)\Theta(n^{2}). One of our constructions gives rise to a family of rank modulation codes for which the trade-off between the number of messages and the number of correctable Kendall errors approaches the optimal scaling rate. Finally, we list a number of possibilities for constructing codes of finite length, and give examples of rank modulation codes with specific parameters.

Keywords

Cite

@article{arxiv.1110.2557,
  title  = {Constructions of Rank Modulation Codes},
  author = {Arya Mazumdar and Alexander Barg and Gilles Zémor},
  journal= {arXiv preprint arXiv:1110.2557},
  year   = {2011}
}

Comments

Submitted to IEEE Transactions on Information Theory

R2 v1 2026-06-21T19:18:57.323Z