Spectral problem for the sixth order nonclassical differential equations

Abstract

In this article we investigate the correctness of boundary value problems for a sixth order quasi-hyperbolic equation in the Sobolev space Lu = 􀀀D6 t u + u 􀀀 u (Dt = @ @t , = Pn i=1 @2 @x2i – Laplace operator, – real parameter). For the given operator L two spectral problems are introduced and uniqueness of these problems is established. The eigenvalues and eigenfunctions of the first spectral problem are calculated for the sixth order quasi-hyperbolic equation. In this work we show that the equation Lu = 0 for < 0 under uniform conditions has a countable set of nontrivial solutions. Usually, this does not happen when the operator L is an ordinary hyperbolic operator.

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Kozhanov A.I.Spectral problem for the sixth order nonclassical differential equations/A.I. Kozhanov[et al.]//Қарағанды универисетінің хабаршысы. Математика Сериясы.=Вестник Карагандинского университета. Серия Математика.=Bulletin of the Karaganda University. Mathematics Series.-2020.-№1(97).-P. 79-86.

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