On LCP codes over a mixed ring alphabet
Abstract
In this paper, we introduce a standard generator matrix for mixed-alphabet linear codes over finite chain rings. Furthermore, we show that, when one has a linear complementary pair (LCP) of mixed-alphabet linear codes, both codes are weakly-free. Additionally, we establish that any mixed-alphabet product group code is separable. Thus, if one has a pair \C, D\ of mixed-alphabet product group codes over a finite chain ring that forms a LCP, it follows that C and the Euclidean dual of D are permutation equivalent.
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