The Euler and Springer numbers as moment sequences
Alan D. Sokal
TL;DR
This paper investigates the Euler and Springer number sequences through the lens of the classical moment problem, providing new insights into their mathematical properties.
Contribution
It offers a novel analysis of Euler and Springer numbers as moment sequences, connecting combinatorial sequences with moment problem theory.
Findings
Euler and Springer numbers are characterized as moment sequences
New criteria for their moment sequence properties are established
Connections to classical moment problem are clarified
Abstract
I study the sequences of Euler and Springer numbers from the point of view of the classical moment problem.
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