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Energy decay of some boundary coupled systems involving wave\ Euler-Bernoulli beam with one locally singular fractional Kelvin-Voigt damping

Mohammad Akil, Université Polytechnique Hauts-de-France, CÉRAMATHS/DEMAV, Campus Mont Houy, Valenciennes-France, Ibtissam Issa, Ali Wehbe, Université Aix-Marseilles, Laboratoire I2M, Marseille, France

2021Mathematical Control and Related Fields23 citationsDOIOpen Access PDF

Abstract

In this paper, we investigate the energy decay of hyperbolic systems of wave-wave, wave-Euler-Bernoulli beam and beam-beam types. The two equations are coupled through boundary connection with only one localized non-smooth fractional Kelvin-Voigt damping. First, we reformulate each system into an augmented model and using a general criteria of Arendt-Batty, we prove that our models are strongly stable. Next, by using frequency domain approach, combined with multiplier technique and some interpolation inequalities, we establish different types of polynomial energy decay rate which depends on the order of the fractional derivative and the type of the damped equation in the system.

Topics & Concepts

Mathematical analysisMathematicsFractional calculusMultiplier (economics)Beam (structure)Boundary value problemPhysicsWave equationBoundary (topology)Bernoulli's principleEuler's formulaOpticsEconomicsThermodynamicsMacroeconomicsStability and Controllability of Differential EquationsAdvanced Mathematical Modeling in EngineeringAdvanced Mathematical Physics Problems
Energy decay of some boundary coupled systems involving wave\ Euler-Bernoulli beam with one locally singular fractional Kelvin-Voigt damping | Litcius