The 3-sparsity of Xn-1 over finite fields, II

Abstract

Let q be a power of 2 and let Fq be the finite field with q elements. For a positive integer n, the polynomial Xn-1∈Fq[X] is called 3-sparse over Fq if every monic irreducible factor of Xn-1 over Fq has at most three nonzero terms. This corrected version gives the characteristic-two classification. Writing n=2λ m with m odd, Xn-1 is 3-sparse over Fq if and only if either (m) q2-1, or q=2e, 3 e, and m lies in the exceptional 7-family \[ m=7A s0, A1, (s0,7)=1, (s0) q-1, 3 s0/(s0,q-1), \] with the additional maximal 7-adic orbit condition 7a(q)=3·7a-1 for 1 a A. The latter condition is equivalent to A=1 or 7 e. This condition is necessary; for example, X49-1 is not 3-sparse over F128.