TY - EJOUR
DO - 10.1090/S0025-5718-99-00988-6
AB - Gauss periods have been used successfully as a tool for constructing normal bases in finite fields. Starting from a primitive $r$th root of unity, one obtains under certain conditions a normal basis for $mathbb F_q^n$ over $ F_q$, where $r$ is a prime and $nk=r-1$ for some integer $k$. We generalize this construction by allowing arbitrary integers $r$ with $nk=\varphi(r)$, and find in many cases smaller values of $k$ than is possible with the previously known approach
T1 - Normal bases in finite fields via general Gauss periods
IS - 225
DA - 1999
AU - Feisel, S.
AU - von zur Gathen, J.
AU - Shokrollahi, A.
JF - Mathematics of Computation
SP - 271-290
VL - 68
EP - 271-290
ID - 99701
KW - algoweb_numbertheory
KW - algoweb_compalg
UR - http://www.ams.org/mcom/1999-68-225/S0025-5718-99-00988-6/S0025-5718-99-00988-6.pdf
ER -