Notes on polynomials (1+X)n + (-1)n(Xn+1) concerning the regularity problem for symmetric power sums in 3 variables
Abstract
Let K be a field and f n(X) = (X + 1) n + (-1) n(X n + 1) ∈ K[X], for each n ∈ N. This note shows that the polynomials f m(X) and f m'(X) are relatively prime, for some distinct indices m and m at most equal to 100, if and only if the product mm is divisible by 6.
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