A new identity of Dickson polynomials
Abstract
A new polynomial identity is found for Dickson polynomials in characteristic 2. The identity is used to prove that the two polynomials xq+1+x+1/a and C(x)+a have the same splitting field over F, where F is a field of characteristic 2, a is a nonzero element of F, q=2n>2, and C(x) = x (Σi=0n-1 x2i-1)q+1 is a M\"uller--Cohen--Matthews polynomial of degree (q2-q)/2. In addition, a new proof is obtained for the known result that C(x) induces a permutation on F2m if 2m and n are relatively prime.
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