A Swan-like Theorem
Abstract
Richard G. Swan proved in 1962 that trinomials x8k + xm + 1 with 8k > m have an even number of irreducible factors, and so cannot be irreducible. In fact, he found the parity of the number of irreducible factors for any square-free trinomial in F2[x]. We prove a result that is similar in spirit. Namely, suppose n is odd and f(x) = xn + Sumi in S xi + 1 in F2[x], where S subset i : i odd, i < n/3 Union i : i = n (mod 4), i < n We show that if n = +-1 (mod 8) then f(x) has an odd number of irreducible factors, and if n = +=3 (mod 8) then f(x) has an even number of irreducible factors. This has an application to the problem of finding polynomial bases 1,a,a2,...an-1 of F2n such that Tr(ai) = 0 for all 1 <= i < n.
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