On the number of real zeroes of a homogeneous differential polynomial and a generalization of the Hawaii conjecture
Abstract
For a given real polynomial p we study the possible number of real roots of a differential polynomial H[p](x) = (p'(x))2-p(x)p''(x), ∈ R. In the special case when all real zeros of the polynomial p are simple, and all roots of its derivative p' are real and simple, the distribution of zeros of H[p] is completely described for each real . We also provide counterexamples to two Boris Shapiro's conjectures about the number of zeros of the function Hn-1n[p].
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