Asymptotic Distribution Of The Roots Of The Ehrhart Polynomial Of The Cross-Polytope
Abstract
We use the method of steepest descents to study the root distribution of the Ehrhart polynomial of the d-dimensional cross-polytope, namely Ld, as d→ ∞. We prove that the distribution function of the roots, approximately, as d grows, by variation of argument of the generating function Σm≥ 0Ld(m)tm+x-1=(1+t)d(1-t)-d-1tx-1, as t varies appropriately on the segment of the imaginary line contained inside the unit disk.
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