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Attractors for a fluid-structure interaction problem in a time-dependent phase space

Filippo Gazzola, Vittorino Pata, Clara Patriarca

2023Journal of Functional Analysis12 citationsDOIOpen Access PDF

Abstract

This paper is concerned with the long-time dynamics of a fluid-structure interaction problem describing a Poiseuille inflow through a 2D channel containing a rectangular obstacle. Physically, this models the interaction between the wind and the deck of a bridge in a wind tunnel experiment, as time goes to infinity. Due to this interaction, the fluid domain depends on time in an unknown fashion and the problem needs a delicate functional analytic setting. As a result, the solution operator associated to the system acts on a time-dependent phase space, and it cannot be described in terms of a semigroup nor of a process. Nonetheless, we are able to extend the notion of global attractor to this particular setting, and prove its existence and regularity. This provides a strong characterization of the asymptotic behavior of the problem. Moreover, when the inflow is sufficiently small, the attractor reduces to the unique stationary solution of the system, corresponding to a perfectly symmetric configuration.

Topics & Concepts

AttractorInflowMathematicsPhase spaceDomain (mathematical analysis)Fluid–structure interactionMathematical analysisInfinityOperator (biology)Space (punctuation)Applied mathematicsMechanicsPhysicsComputer scienceOperating systemFinite element methodGeneThermodynamicsTranscription factorBiochemistryChemistryRepressorStability and Controllability of Differential EquationsNavier-Stokes equation solutionsAdvanced Mathematical Modeling in Engineering
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