A complete characterization of irreducible cyclic orbit codes and their Plücker embedding (original) (raw)
Abstract
Constant dimension codes are subsets of the finite Grassmann variety. The study of these codes is a central topic in random linear network coding theory. Orbit codes represent a subclass of constant dimension codes. They are defined as orbits of a subgroup of the general linear group on the Grassmannian. This paper gives a complete characterization of orbit codes that are generated by an irreducible cyclic group, i.e. a group having one generator that has no non-trivial invariant subspace. We show how some of the basic properties of these codes, the cardinality and the minimum distance, can be derived using the isomorphism of the vector space and the extension field. Furthermore, we investigate the Plücker embedding of these codes and show how the orbit structure is preserved in the embedding.
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References
- Ahlswede R., Cai N., Li S.-Y.R., Yeung R.W.: Network information flow. IEEE Trans. Inf. Theor. 46, 1204–1216 (2000)
Article MathSciNet MATH Google Scholar - Elsenhans A., Kohnert A., Wassermann A.: Construction of codes for network coding. In: Proceedings of the 19th International Symposium on Mathematical Theory of Networks and Systems—MTNS, pp. 1811–1814. Budapest (2010).
- Etzion T., Silberstein N.: Error-correcting codes in projective spaces via rank-metric codes and Ferrers diagrams. IEEE Trans. Inf. Theor. 55(7), 2909–2919 (2009)
Article MathSciNet Google Scholar - Hirschfeld J.W.P.: Projective Geometries Over Finite Fields. Oxford Mathematical Monographs 2nd edn. The Clarendon Press Oxford University Press, New York (1998)
Google Scholar - Hodge W.V.D., Pedoe D.: Methods of Algebraic Geometry, Vol. II. Cambridge University Press (1952).
- Kohnert A., Kurz S.: Construction of large constant dimension codes with a prescribed minimum distance. In: Jacques C., Willi G., Müller-Quade Jörn (eds.), MMICS, vol. 5393 of Lecture Notes in Computer Science. Springer, pp. 31–42 (2008).
- Kötter R., Kschischang F.R.: Coding for errors and erasures in random network coding. IEEE Trans. Inf. Theor. 54(8), 3579–3591 (2008)
Article Google Scholar - Lidl R., Niederreiter H.: Introduction to Finite Fields and their Applications. Cambridge University Press, Cambridge London (1986)
MATH Google Scholar - Manganiello F., Gorla E., Rosenthal J.: Spread codes and spread decoding in network coding. In: Proceedings of the 2008 IEEE International Symposium on Information Theory, pp. 851–855. Toronto, Canada (2008).
- Manganiello F., Trautmann A.-L., Rosenthal J.: On conjugacy classes of subgroups of the general linear group and cyclic orbit codes. In: Proceedings of the 2011 IEEE International Symposium on Information Theory, pp. 1916–1920, 31, 5 Aug (2011).
- Manganiello F., Trautmann A.-L.: Spread decoding in extension fields. arXiv:1108.5881v1 [cs.IT], (2011).
- Silva D., Kschischang F.R., Kötter R.: A rank-metric approach to error control in random network coding. Proc. IEEE Int. Symp. Inf. Theor. 54(9), 3951–3967 (2008)
Article Google Scholar - Trautmann A.-L., Manganiello F., Rosenthal J.: Orbit codes—a new concept in the area of network coding. In: Information Theory Workshop (ITW), IEEE, pp. 1–4, Dublin August (2010).
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Authors and Affiliations
- Institute of Mathematics, University of Zurich, Zurich, Switzerland
Joachim Rosenthal & Anna-Lena Trautmann
Authors
- Joachim Rosenthal
- Anna-Lena Trautmann
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Correspondence toAnna-Lena Trautmann.
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This is one of several papers published in Designs, Codes and Cryptography comprising the “Special Issue on Coding and Cryptography”.
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Rosenthal, J., Trautmann, AL. A complete characterization of irreducible cyclic orbit codes and their Plücker embedding.Des. Codes Cryptogr. 66, 275–289 (2013). https://doi.org/10.1007/s10623-012-9691-5
- Received: 05 September 2011
- Revised: 29 February 2012
- Accepted: 30 April 2012
- Published: 19 May 2012
- Issue date: January 2013
- DOI: https://doi.org/10.1007/s10623-012-9691-5