Root System of a Perturbation of a Selfadjoint Operator with Discrete Spectrum

Adduci, James; Mityagin, Boris

doi:10.1007/s00020-012-1967-7

Cited by 20 publications

(43 citation statements)

References 10 publications

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“…It would be natural to expect that Hamiltonians whose imaginary parts are integrable functions on phase space will not lead to similar divergences, and, in the presence of P T -symmetry, a bounded mapping to a Hermitian counterpart would be expected. It has been proven in [31][32][33], for example, that certain well-behaved types of non-Hermitian perturbations of Hermitian operators with "harmonic oscillator type" spectra will lead to Riesz bases, an no finite time divergences would be expected. The systematic investigation of the connection between such mathematical constraints and their physical interpretation would be an interesting topic for further studies.…”

Section: Discussionmentioning

confidence: 99%

Classical and quantum dynamics in the (non-Hermitian) Swanson oscillator

Graefe¹,

Korsch²,

Rushton³

et al. 2015

J. Phys. A: Math. Theor.

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Abstract. The non-Hermitian quadratic oscillator known as Swanson oscillator is one of the popular P T -symmetric model systems. Here a full classical description of its dynamics is derived using recently developed metriplectic flow equations, which combine the classical symplectic flow for Hermitian systems with a dissipative metric flow for the anti-Hermitian part. Closed form expressions for the metric and phasespace trajectories are presented which are found to be periodic in time. Since the Hamiltonian is only quadratic the classical dynamics exactly describes the quantum dynamics of Gaussian wave packets. It is shown that the classical metric and trajectories as well as the quantum wave functions can diverge in finite time even though the P T -symmetry is unbroken, i.e., the eigenvalues are purely real.

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Section: Discussionmentioning

confidence: 99%

Classical and quantum dynamics in the (non-Hermitian) Swanson oscillator

Graefe¹,

Korsch²,

Rushton³

et al. 2015

J. Phys. A: Math. Theor.

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“…In H we consider a matrix differential operator L αβ , where α and β are the two-component vectors, α = α (1) , α (2) , β = β (1) , β (2) . This operator is defined by matrix differential expression (4.8) on the following domain: In the sequel, it is convenient to represent the operator L αβ as the sum, L αβ = L αβ + M, where L αβ coincides with L αβ if one sets C 1 = C 2 = 0.…”

Section: Double-walled Carbon Nanotube Modelmentioning

confidence: 99%

“…Our main result of [41] is the following statement: Theorem 4.4 Assume that the structural parameters are such thatk 1 =k 2 =k andk 1 =k 2 =k. Assume that the boundary parameters α (i) and β (i) , i = 1, 2, are such that the following conditions hold: α (1) = α (2) , β (1) = β (2) ,…”

Section: Double-walled Carbon Nanotube Modelmentioning

confidence: 99%

“…The second paper generalizes the results of the first one to the case of a specific perturbation of a selfadjoint operator in a Hilbert space. The authors of prove the basis property results by employing the spectral asymptotics of the unperturbed selfadjoint operator and evaluating the action of the perturbation operator on the eigenfunctions of the original selfadjoint operator. Among other results, the authors give an elegant construction of a non‐selfadjoint operator with a discrete spectrum, whose set of the generalized eigenfunctions is minimal and complete in a Hilbert space, but is not uniformly minimal.…”

Section: Introductionmentioning

confidence: 99%

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On the completeness of root vectors generated by systems of coupled hyperbolic equations

Shubov

2014

Mathematische Nachrichten

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The paper is the second in a set of two papers, which are devoted to a unified approach to the problem of completeness of the generalized eigenvectors (the root vectors) for a specific class of linear non‐selfadjoint unbounded matrix differential operators. The list of the problems for which such operators are the dynamics generators includes the following: (a) initial boundary‐value problem (IBVP) for a non‐homogeneous string with both distributed and boundary damping; (b) IBVP for small vibrations of an ideal filament with a one‐parameter family of dissipative boundary conditions at one end and with a heavy load at the other end; this filament problem is treated for two cases of the boundary parameter: non‐singular and singular; (c) IBVP for a three‐dimensional damped wave equation with spherically symmetric coefficients and both distributed and boundary damping; (d) IBVP for a system of two coupled hyperbolic equations constituting a Timoshenko beam model with variable coefficients and boundary damping; (e) IBVP for a coupled Euler‐Bernoulli and Timoshenko beam model with boundary energy dissipation (the model known in engineering literature as bending‐torsion vibration model); (f) IBVP for two coupled Timoshenko beams model, which is currently accepted as an appropriate model describing vibrational behavior of a longer double‐walled carbon nanotube. Problems (a)–(c) have been discussed in the first paper of the aforementioned set. Problems (d)–(f) are discussed in the present paper.

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“…Regarding the relations to previous works, the special version of the condition (1.10) with γ = 1 was introduced in [28]; the relation to the operator version of (1.10) used in [2,3,33,34] is discussed in [28] as well. Comparing to previous papers, we allow here a faster condensation of {µ k } at infinity, namely µ k ∼ k γ with γ > 0 is possible, cf.…”

Section: Introductionmentioning

confidence: 99%

Local form-subordination condition and Riesz basisness of root systems

Mityagin

Siegl²

2019

JAMA

Self Cite

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We exploit the so called form-local subordination in the analysis of non-symmetric perturbations of unbounded self-adjoint operators with isolated simple positive eigenvalues. If the proper condition relating the size of gaps between the unperturbed eigenvalues and the strength of perturbation, measured by the form-local subordination, is satisfied, the root system of the perturbed operator contains a Riesz basis and usual asymptotic formulas for perturbed eigenvalues and eigenvectors hold. The power of the abstract perturbation results is demonstrated particularly on Schrödinger operators with possibly unbounded or singular complex potential perturbations.

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Root System of a Perturbation of a Selfadjoint Operator with Discrete Spectrum

Cited by 20 publications

References 10 publications

Classical and quantum dynamics in the (non-Hermitian) Swanson oscillator

Classical and quantum dynamics in the (non-Hermitian) Swanson oscillator

On the completeness of root vectors generated by systems of coupled hyperbolic equations

Local form-subordination condition and Riesz basisness of root systems

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