107 research outputs found
Weight distributions of cyclic codes with respect to pairwise coprime order elements
Let be an extension of a finite field with . Let
each be of order in and for .
We define a cyclic code over by
where
and . In this paper,
we present a method to compute the weights of . Further, we determine the weight distributions of the cyclic codes
and .Comment: 18 pages. arXiv admin note: substantial text overlap with
arXiv:1306.527
Weight distribution of two classes of cyclic codes with respect to two distinct order elements
Cyclic codes are an interesting type of linear codes and have wide
applications in communication and storage systems due to their efficient
encoding and decoding algorithms. Cyclic codes have been studied for many
years, but their weight distribution are known only for a few cases. In this
paper, let be an extension of a finite field and ,
we determine the weight distribution of the cyclic codes c(a, b)=(\mbox {Tr}_{r/q}(ag_1^0+bg_2^0), \ldots, \mbox
{Tr}_{r/q}(ag_1^{n-1}+bg_2^{n-1})), g_1, g_2\in \Bbb F_r, in the following
two cases: (1) \ord(g_1)=n, n|r-1 and ; (2) \ord(g_1)=n,
, \ord(g_2)=\frac n 2, and
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