Differential uniformity and costacyclic code from some power mapping
Abstract: In this paper, we study the differential properties of $xd$ over $\mathbb{F}_{pn}$ with $d=p{2l}-p{l}+1$. By studying the differential equation of $xd$ and the number of rational points on some curves over finite fields, we completely determine differential spectrum of $x{d}$. Then we investigate the $c$-differential uniformity of $x{d}$. We also calculate the value distribution of a class of exponential sum related to $xd$. In addition, we obtain a class of six-weight consta-cyclic codes, whose weight distribution is explicitly determined. Part of our results is a complement of the works shown in [\ref{H1}, \ref{H2}] which mainly focus on cross correlations.
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