Abstract
In this paper, we first generalize the complementary pair of codes over finite fields to an l-linear complementary pair (l-LCP) of codes. Then two criteria of l-LCP of codes over finite fields are obtained. We especially investigate l-LCP of constacyclic codes. When C and D are all \(\lambda \)-constacyclic codes, we obtain a characterization of (C, D) to be l-LCP of codes. When C and D are cyclic and negacyclic codes, we give a sufficient condition of (C, D) to be l-LCP of codes. As an application, by means of the l-LCP of codes over finite fields, we exhibit two methods of constructing entanglement-assisted quantum error correcting (EAQEC) codes. Notably, the parameters of our EAQEC codes are new and flexible.
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This work was supported by Research Funds of Hubei Province (Grant No. Q20164505) and the talent project of Hubei Polytechnic University of China (Grant No. 16xjzo8R).
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Liu, J., Liu, X. l-LCP of codes and their applications to EAQEC codes. Quantum Inf Process 22, 186 (2023). https://doi.org/10.1007/s11128-023-03932-3
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DOI: https://doi.org/10.1007/s11128-023-03932-3