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Abstract
We determine the structure of cyclic codes over\(\mathbb{Z}_{4}\) for arbitrary even length giving the generator polynomial for these codes. We determine the number of cyclic codes for a given length. We describe the duals of the cyclic codes, describe the form of cyclic codes that are self-dual and give the number of these codes. We end by examining specific cases of cyclic codes, giving all cyclic self-dual codes of length less than or equal to 14.
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Authors and Affiliations
Department of Mathematics, University of Scranton, Scranton, PA, 18510, USA
Steven T. Dougherty
Division of Mathematical Sciences, School of Physical and Mathematical Sciences, Nanyang Technological University, Block 5, Level 3, 1 Nanyang Walk, Singapore, 637616, Republic of Singapore
San Ling
- Steven T. Dougherty
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Correspondence toSteven T. Dougherty.
Additional information
Communicated by: T. Helleseth
San Ling - The research of the second named author is partially supported by research Grants MOE-ARF R-146-000-029-112 and DSTA R-394-000-011-422.
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Dougherty, S.T., Ling, S. Cyclic Codes Over\(\mathbb{Z}_{4}\) of Even Length.Des Codes Crypt39, 127–153 (2006). https://doi.org/10.1007/s10623-005-2773-x
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