A remark about positive polynomials
Abstract
The following theorem is proved. Theorem. Let P(x) = Σk=02n ak xk be a polynomial with positive coefficients. If the inequalities a2k+12a2ka2k+ 2 < 1cos2(πn+2) hold for all k=0, 1, ..., n-1, then P(x)>0 for every x∈R . We show that the constant 1cos2(πn+2) in this theorem could not be increased. We also present some corollaries of this theorem.
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