Divisibility of Griesmer Codes
Abstract: In this paper, we consider Griesmer codes, namely those linear codes meeting the Griesmer bound. Let $C$ be an $[n,k,d]_q$ Griesmer code with $q=pf$, where $p$ is a prime and $f\ge1$ is an integer. In 1998, Ward proved that for $q=p$, if $pe|d$, then $pe|\mathrm{wt}(c)$ for all $c\in C$. In this paper, we show that if $qe|d$, then $C$ has a basis consisting of $k$ codewords such that the first $\min\left{e+1,k\right}$ of them span a Griesmer subcode with constant weight $d$ and any $k-1$ of them span a $[g_q(k-1,d),k-1,d]_q$ Griesmer subcode. Using the $p$-adic algebraic method together with this basis, we prove that if $qe|d$, then $pe|\mathrm{wt}(c)$ for all $c\in C$. Based on this fact, using the geometric approach with the aforementioned basis, we show that if $pe|d$, then $\Delta |{\rm wt}(c)$ for all $c\in C$, where $\Delta=\left\lceil p{e-(f-1)(q-2)}\right\rceil$.
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