Yasser Khalili scite author profile

Yasser Khalili

5Publications

11Citation Statements Received

38Citation Statements Given

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Affiliations

Sari Agricultural Sciences and Natural Resources University, University of Mazandaran, Islamic Azad University Sari Branch

Publications

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On the determination of the impulsive Sturm–Liouville operator with the eigenparameter‐dependent boundary conditions

Khalili

Kadkhoda²,

Băleanu

2020

Math Methods in App Sciences

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In the present work, we consider the inverse problem for the impulsive Sturm–Liouville equations with eigenparameter‐dependent boundary conditions on the whole interval (0,π) from interior spectral data. We prove two uniqueness theorems on the potential q(x) and boundary conditions for the interior inverse problem, and using the Weyl function technique, we show that if coefficients of the first boundary condition, that is, h1,h2, are known, then the potential function q(x) and coefficients of the second boundary condition, that is, H1,H2, are uniquely determined by information about the eigenfunctions at the midpoint of the interval and one spectrum or partial information on the eigenfunctions at some internal points and some of two spectra.

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The interior inverse problem for the impulsive Sturm–Liouville equation

Khalili

Kadkhoda²

2020

Anal.Math.Phys.

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Recovering differential pencils with spectral boundary conditions and spectral jump conditions

Khalili

Băleanu

2020

J Inequal Appl

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In this work, we discuss the inverse problem for second order differential pencils with boundary and jump conditions dependent on the spectral parameter. We establish the following uniqueness theorems: $(i)$ ( i ) the potentials $q_{k}(x)$ q k ( x ) and boundary conditions of such a problem can be uniquely established by some information on eigenfunctions at some internal point $b\in (\frac{\pi }{2},\pi )$ b ∈ ( π 2 , π ) and parts of two spectra; $(ii)$ ( i i ) if one boundary condition and the potentials $q_{k}(x)$ q k ( x ) are prescribed on the interval $[\pi /2(1-\alpha ),\pi ]$ [ π / 2 ( 1 − α ) , π ] for some $\alpha \in (0, 1)$ α ∈ ( 0 , 1 ) , then parts of spectra $S\subseteq \sigma (L)$ S ⊆ σ ( L ) are enough to determine the potentials $q_{k}(x)$ q k ( x ) on the whole interval $[0, \pi ]$ [ 0 , π ] and another boundary condition.

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Inverse problems for the impulsive Sturm–Liouville operator with jump conditions

Khalili

Kadkhoda²,

Băleanu

2018

Inverse Problems in Science and Engineering

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Determination of a differential operator with discontinuity from interior spectral data

Neamaty

Khalili

2013

Inverse Problems in Science and Engineering

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Yasser Khalili

On the determination of the impulsive Sturm–Liouville operator with the eigenparameter‐dependent boundary conditions

The interior inverse problem for the impulsive Sturm–Liouville equation

Recovering differential pencils with spectral boundary conditions and spectral jump conditions

Inverse problems for the impulsive Sturm–Liouville operator with jump conditions

Determination of a differential operator with discontinuity from interior spectral data

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