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- Title
BOUNDS FOR CONFLUENT HORN FUNCTION Φ<sub>2</sub> DEDUCED BY MCKAY I<sub>ν</sub> BESSEL LAW.
- Authors
MAŠIREVIĆ, DRAGANA JANKOV; POGÁNY, TIBOR K.
- Abstract
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 cumulative distribution function (CDF) and certain known and less known properties of CDF.
- Subjects
HYPERGEOMETRIC series; MATHEMATICS; APPROXIMATION theory; POLYNOMIALS; ALGEBRA
- Publication
Rad HAZU: Matematicke Znanosti, 2023, Vol 27, p123
- ISSN
1845-4100
- Publication type
Article
- DOI
10.21857/9xn31cd8wy