Esra Kir Arpat scite author profile

In this paper, we analyze the non-selfadjoint Sturm-Liouville operator L defined in the Hilbert space L 2 (R, H) of vector-valued functions which are strongly-measurable and square-integrable in R. L is defined L(y) = −y ′′ + Q(x)y, x ∈ R, for every y ∈ L 2 (R, H) where the potential Q(x) is a non-selfadjoint, completely continuous operator in a separable Hilbert space H for each x ∈ R. We obtain the Jost solutions of this operator and examine the analytic and asymptotic properties. Moreover, we find the point spectrum and the spectral singularities of L and also obtain the sufficient condition which assures the finiteness of the eigenvalues and spectral singularities of L.

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An eigenfunction expansion of the non-selfadjoint Sturm–Liouville operator with a singular potential

Arpat

2013

J Math Chem

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Spectral properties of Sturm–Liouville system with eigenvalue-dependent boundary conditions

Arpat

Mutlu

2015

Int. J. Math.

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In this paper, we consider the boundary value problem [Formula: see text][Formula: see text] where λ is the spectral parameter and [Formula: see text] is a Hermitian matrix such that [Formula: see text] and αi ∈ ℂ, i = 0, 1, 2, with α2 ≠ 0. In this paper, we investigate the eigenvalues and spectral singularities of L. In particular, we prove that L has a finite number of eigenvalues and spectral singularities with finite multiplicities, under the Naimark and Pavlov conditions.

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Spectral Analysis of Non-selfadjoint Second Order Difference Equation with Operator Coefficient

Mutlu

Arpat

2020

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In this paper, we consider the discrete Sturm-Liouville operator generated by second order difference equation with non-selfadjoint operator coefficient. This operator is the discrete analogue of the Sturm-Liouville differential operator generated by Sturm-Liouville operator equation which has been studied in detail. We find the Jost solution of this operator and examine its asymptotic and analytical properties. Then, we find the continuous spectrum, the point spectrum and the set of spectral singularities of this discrete operator. We finally prove that this operator has a finite number of eigenvalues and spectral singularities under a specific condition.

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Esra Kir Arpat

Spectral properties of non-selfadjoint Sturm–Liouville operator with operator coefficient

Spectral properties of non-selfadjoint Sturm-Liouville operator equation on the real axis

An eigenfunction expansion of the non-selfadjoint Sturm–Liouville operator with a singular potential

Spectral properties of Sturm–Liouville system with eigenvalue-dependent boundary conditions

Spectral Analysis of Non-selfadjoint Second Order Difference Equation with Operator Coefficient

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