AbstractLet ƒ(x) be a monic polynomial of degree n with complex coefficients, which factors as ƒ(x) = g (x)h(x), where g and h are monic. Let H(g) be the maximum of the absolute value of the coefficients of g. For 1 ≤ p ≤ ∞, let [ƒ]p denote the pth Bombieri norm of ƒ. This norm is a weighted ℓp norm of the coefficient vector of ƒ, the weights being certain negative powers of the binomial coefficients. We determine explicit constants C(p) such that H(g) ≤ C (p)n[ƒ]p. For p = 2 our result improves a result of Beauzamy. The constants C(1) = 1.38135 … and C (2) = (1 + 5)/2 = 1.61803 … are proved to be best possible. It is conjectured that C(∞) = 2.17601 … is also best possible, and it is shown that the best constant in this case can be no small...