Bounds and Code Constructions for Partially Defect Memory Cells
Abstract
This paper considers coding for so-called partially stuck memory cells. Such memory cells can only store partial information as some of their levels cannot be used due to, e.g., wear out. First, we present a new code construction for masking such partially stuck cells while additionally correcting errors. This construction (for cells with levels) is achieved by generalizing an existing masking-only construction in [1] (based on binary codes) to correct errors as well. Compared to previous constructions in [2], our new construction achieves larger rates for many sets of parameters. Second, we derive a sphere-packing (any number of partially stuck cells) and a Gilbert-Varshamov bound ( partially stuck cells) for codes that can mask a certain number of partially stuck cells and correct errors additionally. A numerical comparison between the new bounds and our previous construction of PSMCs for the case in [2] shows that our construction lies above the Gilbert-Varshamov-like bound for several code parameters.
Cite
@article{arxiv.2009.06512,
title = {Bounds and Code Constructions for Partially Defect Memory Cells},
author = {Haider Al Kim and Sven Puchinger and Antonia Wachter-Zeh},
journal= {arXiv preprint arXiv:2009.06512},
year = {2021}
}
Comments
6 pages, 3 theorems, code construction, sphere-packing-like bound, 2 figures, Gilbert-Varshamov-like bound, 4 figures, Seventeenth International Workshop on Algebraic and Combinatorial Coding Theory Acct 2020, October 11-17, 2020, Bulgaria