Non-existence of a ternary constant weight $(16, 5, 15; 2048)$ diameter perfect code

Denis S. Krotov; Olli Pottonen; Patric R. J. \"Osterg{\aa}rd

arxiv: 1408.6927 · v1 · pith:LMMKJY2Tnew · submitted 2014-08-29 · 💻 cs.IT · math.IT

Non-existence of a ternary constant weight (16, 5, 15; 2048) diameter perfect code

Denis S. Krotov , Patric R. J. \"Osterg{\aa}rd , Olli Pottonen This is my paper

classification 💻 cs.IT math.IT

keywords codesweightconstantdiameternon-existenceperfectternaryabove

0 comments

read the original abstract

Ternary constant weight codes of length $n=2^m$, weight $n-1$, cardinality $2^n$ and distance $5$ are known to exist for every $m$ for which there exists an APN permutation of order $2^m$, that is, at least for all odd $m \geq 3$ and for $m=6$. We show the non-existence of such codes for $m=4$ and prove that any codes with the parameters above are diameter perfect.

This paper has not been read by Pith yet.

Non-existence of a ternary constant weight (16, 5, 15; 2048) diameter perfect code

discussion (0)