On analytic solutions of a differential equation of Shah type in the unit disk. Boundedness of l-index

M. Sheremeta; Y. Trukhan

doi:10.30970/ms.65.2.157-168

M. Sheremeta Lviv Ivan Franko National University Lviv, Ukraine
Y. Trukhan Lviv Ivan Franko National University Lviv, Ukraine https://orcid.org/0000-0002-1502-2929

DOI: https://doi.org/10.30970/ms.65.2.157-168

Keywords: differential equation, analytical function, l-index

Abstract

For an analytic in the unit disk ${\mathbb D}$ solution of the form $f(z)=F(1/(1-z))$,
where $F$ is an entire transcendental function, of the differential equation $(1-z)^nw''+a(1-z)^mw'+bw=0$
(with $n>m\ge 0,\, a\in {\mathbb R},\,b\in {\mathbb R}$) the boundedness of $l$-index of $f$ in ${\mathbb D}$ and $l$-index of $F$ in ${\mathbb C}$ are investigated.

Author Biographies

M. Sheremeta, Lviv Ivan Franko National University Lviv, Ukraine

Lviv Ivan Franko National University
Lviv, Ukraine

Y. Trukhan, Lviv Ivan Franko National University Lviv, Ukraine

Lviv Ivan Franko National University
Lviv, Ukraine

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