Abstract
The decoding algorithm for the correction of errors of arbitrary Mannheim weight has discussed for Lattice constellations and codes from quadratic number fields. Following these lines, the decoding algorithms for the correction of errors of n = p-1/2 length cyclic codes (C) over quaternion integers of Quaternion Mannheim (QM) weight one up to two coordinates have considered. In continuation, the case of cyclic codes of lengths n = p-1/2 and 2n - 1 = p - 2 has studied to improve the error correction efficiency. In this study, we present the decoding of cyclic codes of length n = phi (p) = p - 1 and length 2n - 1 = 2 phi (p) - 1 = 2p - 3 (where p is prime integer and phi is Euler phi function) over Hamilton Quaternion integers of Quaternion Mannheim weight for the correction of errors. Furthermore, the error correction capability and code rate tradeoff of these codes are also discussed. Thus, an increase in the length of the cyclic code is achieved along with its better code rate and an adequate error correction capability.