| 1 |
Uniform Stabilization of Navier-Stokes Equations in Critical Lq -Based Sobolev and Besov Spaces by Finite Dimensional Interior Localized Feedback Controls
Lasiecka I, Priyasad B, Triggiani R
Applied Mathematics and Optimization, 83(3), 1765, 2021 |
| 2 |
Boussinesq System with Partial Viscous Diffusion or Partial Thermal Diffusion Forced by a Random Noise
Yamazaki K
Applied Mathematics and Optimization, 84(SUPPL 1), S1, 2021 |
| 3 |
Two-dimensional laboratory-scale DNS for knocking experiment using n-heptane at engine-like condition
Morii Y, Dubey AK, Nakamura H, Maruta K
Combustion and Flame, 223, 330, 2021 |
| 4 |
Boundary-layer transition model for icing simulations of rotating wind turbine blades
Son C, Kelly M, Kim T
Renewable Energy, 167, 172, 2021 |
| 5 |
Shape Sensitivity Analysis for a Viscous Flow with Navier Boundary Condition
Bsaies C, Dziri R
Applied Mathematics and Optimization, 81(2), 349, 2020 |
| 6 |
Weak Solutions to Unsteady and Steady Models of Conductive Magnetic Fluids
Hamdache K, Hamroun D
Applied Mathematics and Optimization, 81(2), 479, 2020 |
| 7 |
Optimal Distributed Control of Two-Dimensional Nonlocal Cahn-Hilliard-Navier-Stokes Systems with Degenerate Mobility and Singular Potential
Frigeri S, Grasselli M, Sprekels J
Applied Mathematics and Optimization, 81(3), 899, 2020 |
| 8 |
Numerical and Experimental Study on Mixing in Chaotic Micromixers with Crossing Structures
Fuwad A, Hossain S, Ryu H, Ansari MA, Khan MSI, Kim KY, Jeon TJ, Kim SM
Chemical Engineering & Technology, 43(9), 1866, 2020 |
| 9 |
EXACT CONTROLLABILITY IN MINIMAL TIME OF THE NAVIER-STOKES PERIODIC FLOW IN A 2D-CHANNEL
Marinoschi G
SIAM Journal on Control and Optimization, 58(6), 3658, 2020 |
| 10 |
A Compressible Fluid Flow Model Coupling Channel and Porous Media Flows and Its Application to Fuel Cell Materials
Jarauta A, Zingan V, Minev P, Secanell M
Transport in Porous Media, 134(2), 351, 2020 |
