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https://doi.org/10.21857/9xn31cd8wy

Bounds for confluent Horn function Φ2 deduced by McKay Iν Bessel law

Dragana Jankov Maširević ; Department of Mathematics, University of Osijek, 31000 Osijek, Croatia
Tibor K. Pogány orcid id orcid.org/0000-0002-4635-8257 ; Institute of Applied Mathematics, Óbuda University, 1034 Budapest, Hungary Faculty of Maritime Studies, University of Rijeka, 51 000 Rijeka, Croatia


Puni tekst: engleski pdf 576 Kb

str. 123-131

preuzimanja: 182

citiraj


Sažetak

The main aim of this article is to derive by probabilistic method new functional and uniform bounds for Horn confluent hypergeometric Φ2 of two variables and the incomplete Lipschitz–Hankel integral, among others. The main mathematical tools are the representation theorems for the McKay Iν Bessel probability distribution's CDF and certain known and less known properties of cumulative distribution functions.

Ključne riječi

Modified Bessel functions of the first kind; McKay Iν Bessel distribution; confluent Horn Φ2, Φ3 functions; incomplete Lipschitz-Hankel integral; Marcum Q function; functional bounding inequality

Hrčak ID:

307490

URI

https://hrcak.srce.hr/307490

Datum izdavanja:

25.8.2023.

Posjeta: 501 *