2023 Wilmington NC USA
Special Session 61: Qualitative Properties and Numerical Approximations of PDE Systems which Govern Fluid Flows and Flow-Structure Interactions
Organizer(s): George Avalos , Pelin Guven Geredeli

Parallel Session 3 :: Thursday, June 1, 08:00 – 09:30                     MO207
 8:00-8:30  Xukai Yan (Oklahoma State University, USA)
 Sharp stability for the interaction energy
 8:30-9:00  Tien Khai Nguyen (North Carolina State University, USA)
 Shocks interaction for the Burgers-Hilbert Equation
 9:00-9:30  Luz de Teresa (Universidad Nacional Autonoma de Mexico, Mexico)
 Controllability properties of coupled Stokes and Navier Stokes systems

Parallel Session 4 :: Thursday, June 1, 14:00 – 16:00                     MO207
 14:00-14:30  Lorena Bociu (NC State University, USA)
 Analysis of a multiscale model based on the coupling of ODEs and PDEs for tissue perfusion
 14:30-15:00  Yanqiu Guo (Florida International University, USA)
 Analysis of a rotationally constrained convection model
 15:00-15:30  George Avalos (University of Nebraska-Lincoln, USA)
 Polynomial Decay Properties of Multi-layered Elastic-Thermal Interactions
 15:30-16:00  Weinan Wang (University of Arizona, USA)
 Existence and uniqueness of solutions to a model describing gas dynamics

Parallel Session 5 :: Thursday, June 1, 16:30 – 19:00                     MO207
 16:30-17:00  Rasika L Mahawattege (University of Maryland Baltimore County, USA)
 Fluid-Plate Interaction with Kelvin-Voigt damping and bending moment at the interface: Well-posedness, Spectral Analysis, Uniform Stability
 17:00-17:30  Ahmet Ozkan Ozer (Western Kentucky University, USA)
 A Robust Model Reduction for the Boundary Feedback Stabilization of Piezoelectric Beams
 17:30-18:00  Pelin Guven Geredeli (Iowa State University, USA)
 Approximation schemes for the null controllability of structurally damped plate dynamics
 18:00-18:30  Shitao Liu (Clemson University, USA)
 An inverse problem for the Mindlin--Timoshenko system
 18:30-19:00  MADHUMITA ROY (University of Memphis, USA)
 Global Attractors for Suspension Bridge Equation with Mixed Boundary Conditions