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Original scientific paper

On linear codes constructed from finite groups with a trivial Schur multiplier

Mohammad Reza Darafsheh ; Department of Mathematics, Statistics and Computer Science, University of Tehran, Tehran, Iran
Bernardo Gabriel Rodrigues ; Department of Mathematics and Applied Mathematics, University of Pretoria, South Africa
Amin Saeidi ; Department of Mathematics, Statistics and Computer Science, University of Tehran, Tehran, Iran


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Abstract

Using a representation theoretic approach and considering G to be a finite primitive permutation group of degree n with a trivial Schur multiplier, we present a method to determine all binary linear codes of length n that admit G as a permutation automorphism group. In the non-binary case, we can still apply our method, but it will depend on the structure of the stabilizer of a point in the action of G. We show that every binary linear code admitting G as a permutation automorphism group is a submodule of a permutation module defined by a primitive action of G. As an illustration of the method, we consider G to be the sporadic simple group M11 and construct all binary linear codes invariant under G. We also construct some point- and block-primitive 1-designs from the supports of some codewords of the codes in discussion and compute their minimum distances, and in many instances we determine the stabilizers of the non-zero weight codewords.

Keywords

Linear code, Mathieu group, Schur multiplier, triangular graph

Hrčak ID:

303382

URI

https://hrcak.srce.hr/303382

Publication date:

2.6.2023.

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