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Zero asymptotics for successive derivatives of hyperexponential functions with finite essential singularities

math.CV · 2026-04-10 · unverdicted · novelty 7.0 · 2 refs

The authors extend Pólya's shire theorem to hyperexponential functions f=(P/Q)exp(S/T), showing that normalized zero-counting measures of derivatives converge to a Voronoi edge measure augmented by weighted atoms at essential singularities, with explicit microscopic cluster laws.

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Zero asymptotics for successive derivatives of hyperexponential functions with finite essential singularities math.CV · 2026-04-10 · unverdicted · none · ref 24 · 2 links
The authors extend Pólya's shire theorem to hyperexponential functions f=(P/Q)exp(S/T), showing that normalized zero-counting measures of derivatives converge to a Voronoi edge measure augmented by weighted atoms at essential singularities, with explicit microscopic cluster laws.

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