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This article is cited in 9 scientific papers (total in 9 papers)
On a new approach for studying asymptotic behavior of solutions to singular differential equations
N. F. Valeeva, E. A. Nazirovab, Ya. T. Sultanaevc a Institution of Russian Academy of Sciences Institute of Mathematics with Computer Center, Ufa, Russia
b Bashkir State University, Ufa, Russia
c Bashkir State Pedagogical University, Ufa, Russia
Abstract:
In the work we propose a new approach for studying the asymptotic behavior for large $x$ of the solutions to singular linear two-terms differential equations
$$
-\frac{d^n}{dx^n}y(x,\lambda)+\lambda q(x)y(x,\lambda)=0
$$
with a potential $q(x)$ non-regular growing as $x\to\infty$. The idea of constructing the asymptotics for the solutions of singular linear differential equations and its effectiveness is demonstrated for 4th order equations with an oscillating potential.
Keywords:
spectral theory of differential operators, asymptotic formulae for solutions to differential equations.
Received: 24.07.2015
Citation:
N. F. Valeev, E. A. Nazirova, Ya. T. Sultanaev, “On a new approach for studying asymptotic behavior of solutions to singular differential equations”, Ufa Math. J., 7:3 (2015), 9–14
Linking options:
https://www.mathnet.ru/eng/ufa295https://doi.org/10.13108/2015-7-3-9 https://www.mathnet.ru/eng/ufa/v7/i3/p9
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Abstract page: | 467 | Russian version PDF: | 137 | English version PDF: | 22 | References: | 61 |
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