Estimates on the decay of the Laplace-Polya integral

Abstract

The Laplace--P\'olya integral, defined by Jn(r) = 1π∫-∞∞ sincn t (rt) d \, t, appears in several areas of mathematics. We study this quantity by combinatorial methods; accordingly, our investigation focuses on the values at integer r's. Our main result establishes a lower bound for the ratio Jn(r+2)Jn(r) which extends and generalises the previous estimates of Lesieur and Nicolas, and provides a natural counterpart to the upper estimate established in our previous work. We derive the statement by purely combinatorial, elementary arguments. As a corollary, we deduce that no subdiagonal central sections of the unit cube are extremal, apart from the minimal, maximal, and the main diagonal sections. We also prove several consequences for Eulerian numbers.

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