About cookies on this site Our websites require some cookies to function properly (required). In addition, other cookies may be used with your consent to analyze site usage, improve the user experience and for advertising. For more information, please review your options. By visiting our website, you agree to our processing of information as described in IBM’sprivacy statement. To provide a smooth navigation, your cookie preferences will be shared across the IBM web domains listed here.
Publication
ISIT 2017
Conference paper
Constructions of partial MDS codes over small fields
Abstract
Partial MDS (PMDS) codes are a class of erasurecorrecting array codes which combine local correction of the rows with global correction of the array. An m×n array code is called an (r; s) PMDS code if each row belongs to an [n,n - r,r + 1] MDS code and the code can correct erasure patterns consisting of r erasures in each row together with s more erasures anywhere in the array. While a recent construction by Calis and Koyluoglu generates (r; s) PMDS codes for all r and s, its field size is exponentially large. In this paper, a family of PMDS codes with field size O (max{m,nr+s}s) is presented.