Add to ORKGAbstract—An increasing number of applications in computer communications uses erasure codes to cope with packet losses. Systematic maximum-distance separable (MDS) codes are often the best adapted codes. This letter introduces new systematic MDS erasure codes constructed from two Vandermonde matrices. These codes have lower coding and decoding complexities than the others systematic MDS erasure codes. Index Terms—Packet erasure channel, systematic MDS code, Vandermonde matrices. I
Abstract. We introduce the Read-Write-Coding-System (RWC) – a very flexible class of MDS codes usin...
A new family of maximum distance separable (MDS) array codes is presented. The code arrays contain p...
In this paper, we observe simple yet subtle interconnections among design theory, coding theory and ...
International audienceAn increasing number of applications in computer communications uses erasure c...
The Maximum Distance Separable (MDS) code is one of the codes that known as error-correcting code wh...
Distributed file system has emerged in recent years as an efficient solution to store the large amou...
A new family of MDS array codes of size m × n, that we call Br (m, n, t), for correcting multiple co...
Maximum Distance Separable (MDS) codes are used as diffusion layers in the design of the well known ...
In this paper, we propose two novel modulation concepts based on a simple maximum distance separable...
Reliable communication protocols require that all the intended recipients of a message receive the m...
Due to dependence between codeword elements, index modulation (IM) and related modulation techniques...
Abstract—In this paper the decoding capabilities of convolu-tional codes over the erasure channel ar...
none3siIn many applications erasure correcting codes are used to recover packet losses at high proto...
A k x n matrix is an MDS matrix if any k columns are linearly independent. Such matrices span MDS (M...
Array Codes form a class of Error Correcting Codes which are specifically designed to deal with natu...
Abstract. We introduce the Read-Write-Coding-System (RWC) – a very flexible class of MDS codes usin...
A new family of maximum distance separable (MDS) array codes is presented. The code arrays contain p...
In this paper, we observe simple yet subtle interconnections among design theory, coding theory and ...
International audienceAn increasing number of applications in computer communications uses erasure c...
The Maximum Distance Separable (MDS) code is one of the codes that known as error-correcting code wh...
Distributed file system has emerged in recent years as an efficient solution to store the large amou...
A new family of MDS array codes of size m × n, that we call Br (m, n, t), for correcting multiple co...
Maximum Distance Separable (MDS) codes are used as diffusion layers in the design of the well known ...
In this paper, we propose two novel modulation concepts based on a simple maximum distance separable...
Reliable communication protocols require that all the intended recipients of a message receive the m...
Due to dependence between codeword elements, index modulation (IM) and related modulation techniques...
Abstract—In this paper the decoding capabilities of convolu-tional codes over the erasure channel ar...
none3siIn many applications erasure correcting codes are used to recover packet losses at high proto...
A k x n matrix is an MDS matrix if any k columns are linearly independent. Such matrices span MDS (M...
Array Codes form a class of Error Correcting Codes which are specifically designed to deal with natu...
Abstract. We introduce the Read-Write-Coding-System (RWC) – a very flexible class of MDS codes usin...
A new family of maximum distance separable (MDS) array codes is presented. The code arrays contain p...
In this paper, we observe simple yet subtle interconnections among design theory, coding theory and ...