Binary LCD Codes from Z2Z2[u]
Abstract
Linear complementary dual (LCD) codes over finite fields are linear codes satisfying C C=\0\. We generalize the LCD codes over finite fields to Z2Z2[u]-LCD codes over the ring Z2×(Z2+uZ2). Under suitable conditions, Z2Z2[u]-linear codes that are Z2Z2[u]-LCD codes are characterized. We then prove that the binary image of a Z2Z2[u]-LCD code is a binary LCD code. Finally, by means of these conditions, we construct new binary LCD codes using Z2Z2[u]-LCD codes, most of which have better parameters than current binary LCD codes available.
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