Circular-shift-based Vector Linear Network Coding and Its Application to Array Codes

Abstract

Circular-shift linear network coding (LNC) is a class of vector LNC with local encoding kernels selected from cyclic permutation matrices, so that it has low coding complexities. However, it is insufficient to exactly achieve the capacity of a multicast network, so the data units transmitted along the network need to contain redundant symbols, which affects the transmission efficiency. In this paper, as a variation of circular-shift LNC, we introduce a new class of vector LNC over arbitrary GF(p), called circular-shift-based vector LNC, which is shown to be able to exactly achieve the capacity of a multicast network. The set of local encoding kernels in circular-shift-based vector LNC is nontrivially designed such that it is closed under multiplication by elements in itself. It turns out that the coding complexity of circular-shift-based vector LNC is comparable to and, in some cases, lower than that of circular-shift LNC. The new results in circular-shift-based vector LNC further facilitates us to characterize and design Vandermonde circulant maximum distance separable (MDS) array codes, which are built upon the structure of Vandermonde matrices and circular-shift operations. We prove that for r ≥ 2, the largest possible k for an L-dimensional (k+r, k) Vandermonde circulant p-ary MDS array code is pmL-1, where L is an integer co-prime with p, and mL represents the multiplicative order of p modulo L. For r = 2, 3, we introduce two new types of (k+r, k) p-ary array codes that achieves the largest k = pmL-1. For the special case that p = 2, we propose scheduling encoding algorithms for the 2 new codes, so that the encoding complexity not only asymptotically approaches the optimal 2 XORs per original data bit, but also slightly outperforms the encoding complexity of other known Vandermonde circulant MDS array codes with k = pmL-1.

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