On the analytic extension of three ratios of Horn's confluent hypergeometric function $\mathrm{H}_7$

V. Hladun; R. Rusyn; M. Dmytryshyn

doi:10.15421/242405

Researches in Mathematics (Jul 2024)

On the analytic extension of three ratios of Horn's confluent hypergeometric function $\mathrm{H}_7$

V. Hladun,
R. Rusyn,
M. Dmytryshyn

Affiliations

V. Hladun: ORCiD; Lviv Polytechnic National University
R. Rusyn: ORCiD; Vasyl Stefanyk Precarpathian National University
M. Dmytryshyn: ORCiD; West Ukrainian National University

DOI: https://doi.org/10.15421/242405
Journal volume & issue: Vol. 32, no. 1
pp. 60 – 70

Abstract

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In this paper, we consider the extension of the analytic functions of two variables by special families of functions — continued fractions. In particular, we establish new symmetric domains of the analytical continuation of three ratios of Horn's confluent hypergeometric function $\mathrm{H}_7$ with certain conditions on real and complex parameters using their continued fraction representations. We use Worpitzky's theorem, the multiple parabola theorem, and a technique that extends the convergence, already known for a small domain, to a larger domain to obtain domains of convergence of continued fractions, and the PC method to prove that they are also domains of analytical continuation.

Published in Researches in Mathematics

ISSN: 2664-4991 (Print); 2664-5009 (Online)
Publisher: Oles Honchar Dnipro National University
Country of publisher: Ukraine
LCC subjects: Science: Mathematics
Website: https://vestnmath.dnu.dp.ua

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