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Spectral instability of the peaked periodic wave in the reduced Ostrovsky equations

Anna Geyer, Dmitry E. Pelinovsky

2020Proceedings of the American Mathematical Society20 citationsDOIOpen Access PDF

Abstract

We show that the peaked periodic traveling wave of the reduced Ostrovsky equations with quadratic and cubic nonlinearity is spectrally unstable in the space of square integrable periodic functions with zero mean and the same period. We discover that the spectrum of a linearized operator at the peaked periodic wave completely covers a closed vertical strip of the complex plane. In order to obtain this instability, we prove an abstract result on spectra of operators under compact perturbations. This justifies the truncation of the linearized operator at the peaked periodic wave to its differential part for which the spectrum is then computed explicitly.

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Mathematical analysisInstabilityIntegrable systemQuadratic equationSquare-integrable functionMathematicsSpectrum (functional analysis)Operator (biology)Truncation (statistics)Plane (geometry)Nonlinear systemContinuous spectrumPhysicsSpace (punctuation)Plane waveDifferential operatorQuantum mechanicsGeometryGeneBiochemistryPhilosophyLinguisticsChemistryTranscription factorRepressorStatisticsNonlinear Waves and SolitonsDifferential Equations and Numerical MethodsNonlinear Photonic Systems
Spectral instability of the peaked periodic wave in the reduced Ostrovsky equations | Litcius