On eigenvalues of third order composite type equations with regular boundary value conditions
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KSU publ.
Abstract
In the paper the question about distribution of eigenvalues of third-order composite type equations with
regular, more precisely, with periodic boundary value conditions is studied. After, applying the Fourier
method, the original problem splits into two problems on eigenvalues of third-order ordinary differential
operators with periodic boundary value conditions in L2 (0; 1). Characteristic determinants are calculated
and zeros of entire analytic functions are found, and their location on the complex plane is determined.
Existence of an infinite number of eigenvalues of a third order composite type operator is proved. Distance
between the neighboring eigenvalues of the third order composite type operator of each series, which lie on
rays, perpendicular to sides of a conjugate indicator diagram, that is, a regular hexagon on the complex
plane, is determined. Moreover, it is determined that zero is not an eigenvalue of a third order composite
type operator, in other words, zero is a regular point of the operator that belongs to resolvent set of the
original operator. Adjoint operator with periodic boundary value conditions is constructed.
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Imanbaev N.S. On eigenvalues of third order composite type equations with regular boundary value conditions/N.S. Imanbaev, M.N. Ospanov//Қарағанды универисетінің хабаршысы. Математика Сериясы.=Вестник Карагандинского университета. Серия Математика.=Bulletin of the Karaganda University. Mathematics Series.-2019.-№4(96).-С. 44-52.