Yonatan Yehezkeally scite author profile

Abstract-We investigate error-correcting codes for a novel storage technology for flash memories, the rank-modulation scheme. In this scheme, a set of n cells stores information in the permutation induced by the different charge levels of the individual cells. The resulting scheme eliminates the need for discrete cell levels, overcomes overshoot errors when programming cells (a serious problem that reduces the writing speed), and mitigates the problem of asymmetric errors.In this paper, we study the properties of error correction in rank modulation codes. We show that the adjacency graph of permutations is a subgraph of a multi-dimensional array of a special size, a property that enables code designs based on Leemetric codes. We present a one-error-correcting code whose size is at least half of the optimal size. We also present additional error-correcting codes and some related bounds.

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Snake-in-the-box codes for rank modulation

Yehezkeally

Schwartz

2012

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Reconstruction Codes for DNA Sequences with Uniform Tandem-Duplication Errors

Yehezkeally

Schwartz

2018

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Single-Error Detection and Correction for Duplication and Substitution Channels

Tang

Yehezkeally

Schwartz

et al. 2020

IEEE Trans. Inform. Theory

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Reconstruction Codes for DNA Sequences With Uniform Tandem-Duplication Errors

Yehezkeally

Schwartz

2020

IEEE Trans. Inform. Theory

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DNA as a data storage medium has several advantages, including far greater data density compared to electronic media. We propose that schemes for data storage in the DNA of living organisms may benefit from studying the reconstruction problem, which is applicable whenever multiple reads of noisy data are available. This strategy is uniquely suited to the medium, which inherently replicates stored data in multiple distinct ways, caused by mutations. We consider noise introduced solely by uniform tandem-duplication, and utilize the relation to constantweight integer codes in the Manhattan metric. By bounding the intersection of the cross-polytope with hyperplanes, we prove the existence of reconstruction codes with full rate, as well as suggest a construction for a family of reconstruction codes.

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