5-design and counter 5-design in the binary Golay code of length 24
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Publication:6621595
DOI10.21099/tkbjm/20244801043MaRDI QIDQ6621595
Publication date: 18 October 2024
Published in: Tsukuba Journal of Mathematics (Search for Journal in Brave)
Combinatorial aspects of block designs (05B05) Other designs, configurations (05B30) Theory of error-correcting codes and error-detecting codes (94Bxx) Group actions on combinatorial structures (05E18)
Cites Work
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- On self-dual doubly-even extremal codes
- On self-dual, doubly even codes of length 32
- Relative invariants of finite groups generated by pseudoreflections
- The Magma algebra system. I: The user language
- The algebra of invariants.
- Vorlesungen über das Ikosaeder und die Auflösung der Gleichungen vom fünften Grade.
- On the ring of simultaneous invariants for the Gleason-MacWilliams group
- Inequalities for t designs
- Construction of Jacobi forms from certain combinatorial polynomials
- Some 3-designs and a 4-design
- An infinite class of 5-designs
- Das Verhalten von mehrfachen Thetareihen bei Modulsubstitutionen.
- Invariants of finite groups and their applications to combinatorics
- Error-Correcting Codes and Invariant Theory: New Applications of a Nineteenth-Century Technique
- On the notion of Jacobi polynomials for codes
- Four fundamental parameters of a code and their combinatorial significance
- On t-Designs and Groups
- An infinite class of 4-designs
- New 5-designs
- A Theorem on Steiner Systems
- An upper bound for self-dual codes
- Unitary Groups Generated by Reflections
- Invariants of Finite Groups Generated by Reflections
- Algorithms in invariant theory
- Theory and applications of finite groups.
- Reflection groups and invariant theory
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