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X-ORIGINAL-URL:https://cmc.deusto.eus/
X-WR-CALNAME:cmc.deusto.eus
X-WR-CALDESC:DeustoCCM - Chair of Computational Mathematics at University of Deusto
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UID:MEC-ed8b6e740b9f8822cc39ac4c62a211af@cmc.deusto.eus
DTSTART:20221111T100000Z
DTEND:20221111T110000Z
DTSTAMP:20251031T223200Z
CREATED:20251031
LAST-MODIFIED:20251031
PRIORITY:5
TRANSP:OPAQUE
SUMMARY:Mini-workshop: Analysis, Numerics, and Control
DESCRIPTION:Next Friday, November 11, 2022:\nOrganized by: FAU DCN-AvH, Chair for Dynamics, Control and Numerics – Alexander von Humboldt Professorship at FAU, Friedrich-Alexander-Universität Erlangen-Nürnberg (Germany)\n11:00H\nTitle: Stabilization results for the KdV equation\nSpeaker: Hugo Parada\nAffiliation: Visiting PhD Student from the Laboratory Jean Kunztmann, Grenoble (France)\nAbstract.The Korteweg-de Vries (KdV) equation, was introduced as a model to describe the propagation of long water waves in a channel. This nonlinear third order dispersive equation has been many studied in the past years from different points of view, in particular its controllability and stabilization properties. In this talk, we focus on two problems. In the first part, we study the case where the KdV equation is in the presence of a boundary time-varying delay, and we show an exponential stability result. Then, we pass to the KdV equation posed in a star network with bounded and unbounded lengths. In this case we show the exponential stability by acting with damping terms not necessarily in all the branches. This talk is based on joint works with E. Crépeau, C. Prieur, J. Valein and C. Timimoun.\n11:30H\nTitle: Relaxation approximation and asymptotic stability of stratified solutions to the Incompressible Porous Media equation\nSpeaker: Dr. Timothée Crin-Barat\nAffiliation: FAU DCN-AvH Chair for Dynamics, Control and Numerics – Alexander von Humboldt Professorship (Germany)\nAbstract. In this joint work with Roberta Bianchini and Marius Paicu, we address the existence of stably stratified solutions to the two-dimensional Boussinesq equations with damped vorticity. We justify its nonlinear asymptotic stability for initial perturbations in H^s cap H^{1-tau} for s gt 3 and 0 lt tau lt 1. In addition, uniform estimates with respect to the damping parameter allow us to establish the strong relaxation limit of the Boussinesq system towards the Incompressible Porous Media equation (IPM) under a suitable scaling. And, as a byproduct, we deduce the global well-posedness of (IPM) in the same regularity setting. A crucial point of our analysis is the use of an anisotropic Littlewood-Paley decomposition to derive new bounds on the vorticity.\nWHERE?\nOn-site:\nRoom 03.323\nFriedrich-Alexander-Universität Erlangen-Nürnberg\nCauerstraße 11, 91058 Erlangen\nGPS-Koord. Raum: 49.573713N, 11.030428E\n\n
URL:https://cmc.deusto.eus/events-calendar/mini-workshop-analysis-numerics-and-control-5/
ORGANIZER;CN=FAU DCN-AvH:MAILTO:
CATEGORIES:FAU DCN Mini-Workshop,FAU-DCN Workshop
LOCATION:DDS
ATTACH;FMTTYPE=image/png:https://cmc.deusto.eus/wp-content/uploads/FAUDCNAvH-MiniWorkshop-11nov2022-hParada-tCrinBarat.png
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