How to Expand a Self-orthogonal Code
Abstract
In this paper, we show how to expand Euclidean/Hermitian self-orthogonal code preserving their orthogonal property. Our results show that every k-dimension Hermitian self-orthogonal code is contained in a (k+1)-dimensional Hermitian self-orthogonal code. Also, for k< n/2-1, every [n,k] Euclidean self-orthogonal code is contained in an [n,k+1] Euclidean self-orthogonal code. Moreover, for k=n/2-1 and p=2, we can also fulfill the expanding process. But for k=n/2-1 and p odd prime, the expanding process can be fulfilled if and only if an extra condition must be satisfied. We also propose two feasible algorithms on these expanding procedures.
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