Dean Crnkovic, Bernardo Rodrigues, Sanja Rukavina, Vladimir D. Tonchev
Published 2016-02-17Version 1
This paper completes the classification of quasi-symmetric 2-$(64,24,46)$ designs of Blokhuis-Haemers type supported by the dual code $C^{\perp}$ of the binary linear code $C$ spanned by the lines of $AG(3,2^2)$ initiated in \cite{bgr-vdt}. It is shown that $C^{\perp}$ contains exactly 30,264 nonisomorphic quasi-symmetric 2-$(64,24,46)$ designs obtainable from maximal arcs in $AG(2,2^2)$ via the Blokhuis-Haemers construction. The related strongly regular graphs are also discussed.
On the classification of self-dual [20,10,9] codes over GF(7)
On the classification of self-dual $\mathbb{Z}_k$-codes II
Classification of quaternary Hermitian self-dual codes of length 20
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