 Exponential densities and compound Poisson measuresMiłosz Baraniewicz and Kamil Kaleta Mathematische Nachrichten, 2023, vol. 296, issue 11, 5077-5108 Abstract: We prove estimates at infinity of convolutions fn★$f^{n\star }$ and densities of the corresponding compound Poisson measures for a class of radial decreasing densities on Rd$\mathbb {R}^d$, d≥1$d \ge 1$, which are not convolution equivalent. Existing methods and tools are limited to the situation in which the convolution f2★(x)$f^{2\star }(x)$ is comparable to initial density f(x)$f(x)$ at infinity. We propose a new approach, which allows one to break this barrier. We focus on densities, which are products of exponential functions and smaller order terms—they are common in applications. In the case when the smaller order term is polynomial, estimates are given in terms of the generalized Bessel function. Our results can be seen as the first attempt to understand the intricate asymptotic properties of the compound Poisson and more general infinitely divisible measures constructed for such densities. Date: 2023 Downloads: (external link) Related works: Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text Persistent link: https://EconPapers.repec.org/RePEc:bla:mathna:v:296:y:2023:i:11:p:5077-5108 Ordering information: This journal article can be ordered from Access Statistics for this article Mathematische Nachrichten is currently edited by Robert Denk More articles in Mathematische Nachrichten from Wiley Blackwell |
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