Classification of $Delta$-divisible linear codes spanned by codewords of weight $Delta$


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We classify all $q$-ary $Delta$-divisible linear codes which are spanned by codewords of weight $Delta$. The basic building blocks are the simplex codes, and for $q=2$ additionally the first order Reed-Muller codes and the parity check codes. This generalizes a result of Pless and Sloane, where the binary self-orthogonal codes spanned by codewords of weight $4$ have been classified, which is the case $q=2$ and $Delta=4$ of our classification. As an application, we give an alternative proof of a theorem of Liu on binary $Delta$-divisible codes of length $4Delta$ in the projective case.

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