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Sarsenbi, A. M.; Tengaeva, A. A.

On the basis properties of root functions of two generalized eigenvalue problems. (English. Russian original) Zbl 1280.34084

Differ. Equ. 48, No. 2, 306-308 (2012); translation from Differ. Uravn. 48, No. 2, 294-296 (2012).
Consider the boundary eigenvalue problems \[ \begin{gathered} -u''(x)=\lambda u(-x)\quad\text{for }-1<x<1,\\ u'(-1)=\alpha u'(1),\quad u(-1)= u(1),\end{gathered}\tag{1} \] and \[ \begin{gathered} -u''(x)=\lambda u(-x)\quad\text{for }-1< x< 1,\\ u'(-1)= u'(1)- u(-1)- u(1),\quad u(-1)+\alpha u(1)= 0.\end{gathered}\tag{2} \] The authors prove that in the case \(\alpha^2\neq 1\), the system of root functions of the boundary eigenvalue problems (1) and (2) form a Riesz basis in \(L_2(-1,1)\).
Reviewer: Klaus R. Schneider (Berlin)

Cited in 16 Documents

MSC:

34L10 Eigenfunctions, eigenfunction expansions, completeness of eigenfunctions of ordinary differential operators
34B08 Parameter dependent boundary value problems for ordinary differential equations
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References:

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[6] Sarsenbi, A.M., On the Riesz Basis Property of a System of Eigenfunctions of a Boundary Value Problem for the Equation -u”(-x) = {\(\lambda\)}u(x), Izv. NAN Resp. Kazakhstan Ser. Fiz.-Mat., 2007, no. 3, pp. 32–34.
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