On the roots of a hyperbolic polynomial pencil
Abstract
Let 0(t),1(t),\,…\,,n(t) be the roots of the equation R(z)=t, where R(z) is a rational function of the form \[R(z)=z+Σk=1nαkz-μk,\] μk are pairwise different real numbers, αk>0,\,1≤k≤n. Then for each real , the function e0(t)+e1(t)+\,·s\,+en(t) is exponentially convex on the interval -∞<t<∞.
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