All binary linear codes that are invariant under $\PSL_2(n)$

Cunsheng Ding; Hao Liu; and Vladimir D. Tonchev

arXiv:1704.01199·cs.IT·April 6, 2017·2 cites

All binary linear codes that are invariant under $\PSL_2(n)$

Cunsheng Ding, Hao Liu, and Vladimir D. Tonchev

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Abstract

The projective special linear group $\PSL_{2} (n)$ is $2$ -transitive for all primes $n$ and $3$ -homogeneous for $n \equiv 3 (mod 4)$ on the set ${0, 1, \dots, n - 1, \infty}$ . It is known that the extended odd-like quadratic residue codes are invariant under $\PSL_{2} (n)$ . Hence, the extended quadratic residue codes hold an infinite family of $2$ -designs for primes $n \equiv 1 (mod 4)$ , an infinite family of $3$ -designs for primes $n \equiv 3 (mod 4)$ . To construct more $t$ -designs with $t \in {2, 3}$ , one would search for other extended cyclic codes over finite fields that are invariant under the action of $\PSL_{2} (n)$ . The objective of this paper is to prove that the extended quadratic residue binary codes are the only nontrivial extended binary cyclic codes that are invariant under $\PSL_{2} (n)$ .

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TopicsCoding theory and cryptography · Finite Group Theory Research · Cooperative Communication and Network Coding