Hutchinson's intervals and entire functions from the Laguerre-P\'olya class
Abstract
We find the intervals [α, β (α)] such that if a univariate real polynomial or entire function f(z) = a0 + a1 z + a2 z2 + ·s with positive coefficients satisfy the conditions ak-12ak-2ak ∈ [α, β(α)] for all k ≥ 2, then f belongs to the Laguerre--P\'olya class. For instance, from J.I.~Hutchinson's theorem, one can observe that f belongs to the Laguerre--P\'olya class (has only real zeros) when qk(f) ∈ [4, + ∞). We are interested in finding those intervals which are not subsets of [4, + ∞).
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