Riesz Basis Property of Weak Eigenfunctions for Boundary-Value Problem with Discontinuities at Two Interior Points

机译：两个内部点中不连续性的边基值问题弱特征障碍的基础属性

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We investigate one discontinuous boundary value problem which consist of a Sturm-Liouville equation with piecewise continuous potential together with eigenparameter-dependent boundary conditions and four supplementary transmission conditions. We establish some spectral properties of the considered problem. For the problem under consideration we define a new concept so-called weak eigenfunctions which is an extension of a classical eigenfunction and prove that the system of weak eigenfunctions form a Riesz basis of the appropriate Hilbert space for the modified Lebesgue space.

机译：我们调查一个不连续的边界值问题，该问题由Sturm-Liouville方程组成，其具有分段连续电位以及特征分数依赖性边界条件和四个补充传输条件。我们建立了考虑问题的一些光谱特性。对于所考虑的问题，我们定义了一种新的概念所谓的弱特征，这是经典特征的延伸，并证明了弱特征障碍的系统形成了修改的lebesgue空间的适当希尔伯特空间的riesz基础。

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《International Conference on Advances in Natural and Applied Sciences》|2017年|1 volume (various pagings) :|共4页
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H. Ol?ar; O. Sh. Mukhtarov; K. Aydemir;
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中图分类 P31-532;
关键词
together; eigenparameter-dependent; modified Lebesgue space;

机译：一起;eigenparameter依赖;修改了lebesgue空间;

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Riesz Basis Property of Weak Eigenfunctions for Boundary-Value Problem with Discontinuities at Two Interior Points

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