Shape optimization for an obstacle located in incompressible Boussinesq flow
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Publication:2083895
DOI10.1016/j.compfluid.2022.105431OpenAlexW4220998371MaRDI QIDQ2083895
Jiangyong Hou, Yingyuan Li, Wen-Jing Yan
Publication date: 17 October 2022
Published in: Computers and Fluids (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.compfluid.2022.105431
Boussinesq equationsadjoint methodshape gradientfunction space parametrizationshape inverse designshape optimal control
Cites Work
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- First- and second-order aerodynamic sensitivity derivatives via automatic differentiation with incremental iterative methods
- Shape and topology optimization for elliptic boundary value problems using a piecewise constant level set method
- Reconstruction of obstacles immersed in an incompressible fluid
- Optimal shape determination of a body located in incompressible viscous fluid flow
- Computational algorithms for aerodynamic analysis and design
- Shape inverse problem for Stokes-Brinkmann equations
- Computationally efficient, numerically exact design space derivatives via the complex Taylor's series expansion method
- An adjoint method for shape optimization in unsteady viscous flows
- A numerical method for the viscous incompressible Oseen flow in shape reconstruction
- One-shot pseudo-time method for aerodynamic shape optimization using the Navier-Stokes equations
- Localization of small obstacles in Stokes flow
- Topological Sensitivity Analysis for the Location of Small Cavities in Stokes Flow
- Level set method with topological derivatives in shape optimization
- Shape Optimization of Body Located in Incompressible Viscous Flow Based on Optimal Control Theory
- A one-shot optimization framework with additional equality constraints applied to multi-objective aerodynamic shape optimization
- Perspectives in Flow Control and Optimization
- Determination of the truss static state by means of the combined FE/GA approach, on the basis of strain and displacement measurements
- Solution to shape optimization problems of viscous flow fields
- S<scp>HAPE</scp> O<scp>PTIMIZATION IN</scp> F<scp>LUID</scp> M<scp>ECHANICS</scp>
- Shape optimal design problem with convective and radiative heat transfer: Analysis and implementation
- An introduction to the adjoint approach to design
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