Coding Matrices for $GL(2,q)$
Coding Matrices for $GL(2,q)$
We use the BN-pair structure for the general linear group to write a suitable listing of the elements of the finite group $GL(2,q)$ which is then used to determine its ring of matrices. This approach of identifying finite group ring with ring of matrices has been used effectively to construct linear codes, benefiting from the ring-theoretic structure of both group rings and the ring of matrices.
Keywords:
Group ring, G-matrix BN-pair, Error-correcting codes,
___
- [1] F. J. Macwilliams, Codes and ideals in group algebras, Comb. Math. Appl., (1969), 312-328.
- [2] S. D. Berman, On the theorey of group codes, Kibernetika, 3(1) (1967), 31-39.
- [3] R. Ferraz, Polcino Milies, Idempotents in group algebras and minimal abelian codes, Finite Fields Appl., 13 (2007), 382-393.
- [4] T. Hurley, Group rings and ring of matrices, Inter. J. Pure Appl. Math., 31(3) (2006), 319-335.
- [5] P. Hurley, T. Hurely, Block Codes from Matrix and Group Rings, Chapter 5, (Eds.) I. Woungang, S. Misra, S.C. Misma, Selected Topics in Information and Coding Theory, World Scientific, 2010, 159-194.
- [6] C. Curtis, I. Reiner, Methods of Representation Theory, Wiley, New York, 1987.
- ISSN: 2645-8845
- Yayın Aralığı: Yılda 4 Sayı
- Başlangıç: 2018
- Yayıncı: Fuat USTA
Sayıdaki Diğer Makaleler
Nonexistence of Global Solutions for the Kirchhoff-Type Equation with Fractional Damped
Christian BARRİENTOS, Sarah MİNİON
Ahmed A. KHAMMASH, Marwa M. HAMED
Djourdem HABİB, Slimane BENAİCHA, Noureddine BOUTERAA
On Semi-Invariant Submanifolds of Trans-Sasakian Finsler Manifolds
Ayşe Funda SAĞLAMER, Nesrin ÇALIŞKAN
$\alpha_\kappa-$Implicit Contraction in non-AMMS with Some Applications
Ekber GİRGİN, Mahpeyker ÖZTÜRK
Minimum Degree and Size Conditions for Hamiltonian and Traceable Graphs
Rao Lİ, Anuj DAGA, Vivek GUPTA, Manad MİSHRA, Spandan Kumar SAHU, Ayush SİNHA
M. JANAKİ, K. KANAGARAJAN, E. M. ELSAYED