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Journal of Shanghai University >

2020 , Vol. 26 >Issue 4: 671 - 680

DOI: https://doi.org/10.12066/j.issn.1007-2861.2212

Application of adaptive level set method in shape optimization for Stokes problem

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  • School of Sciences, Xi'an University of Technology, Xi'an 710048, China

Received date: 2020-01-15

  Online published: 2020-09-03

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Abstract

We present a level-set-based adaptive mesh method for solving the drag minimization problem of incompressible flow governed by the Stokes equations. A shape sensitivity analysis of the cost functional is presented. Two levels of meshes are employed during the optimization. A uniform coarse mesh for evolving the level set function is defined over the entire computational domain. Additionally, the level set function serves as a refinement indicator. The coarse mesh comprising the interfaces is then further divided into a uniform fine mesh. The computation is performed mainly near the interfaces. Therefore, the computational cost is significantly reduced compared with the uniform refined mesh over the whole domain that achieves the same resolution. Furthermore, the shape derivative on the boundary can be obtained implicitly, which is a very challenging task in classical optimal shape design problems.

Key words: adaptive mesh method; level set method; Stokes problem; shape optimization

Cite this article

DUAN Xianbao, DANG Yan, QIN Ling . Application of adaptive level set method in shape optimization for Stokes problem[J]. Journal of Shanghai University, 2020 , 26(4) : 671 -680 . DOI: 10.12066/j.issn.1007-2861.2212

References

[1] Pironneau O. On optimal profiles in Stokes flow[J]. J Fluid Mech, 1973,59:117-128.
[2] Thevenin D, Janiga G. Optimization and computational fluid dynamics[M]. Heidelberg: Springer, 2008.
[3] Plotnikov P, Sokolowski J. Compressible Navier-Stokes equations: theory and shape optimization[M]. Basel: Springer, 2012.
[4] Niklas K, Mueller, P M. Decoupling of control and force objective in adjoint-based fluid dynamic shape optimization[J]. AIAA Journal, 2019,57(9):4110-4114.
[5] Qyyum M A, Noon A A, Wei F, et al. Vortex tube shape optimization for hot control valves through computational fluid dynamics[J]. International Journal of Rfrigera-tion-Revue Internationale Du Froid, 2019,102:151-158.
[6] Zhou M, Lian H, Sigmund O, et al. Shape morphing and topology optimization of fluid channels by explicit boundary tracking[J]. International Journal for Numerical Methods in Fluids, 2018,88(6):296-313.
[7] Heners J P, Radtke L, Hinze M, et al. Adjoint shape optimization for fluid-structure interaction of ducted flows[J]. Computational Mechanics, 2018,61(3):259-276.
[8] Mohammadi B, Pironneau O. Applied shape optimization for fluids [M]. 2nd ed. Oxford: Oxford University Press, 2010.
[9] Osher S, Sethian J A. Fronts propagating with curvature-dependent speed: algorithms based on Hamilton-Jacobi formulations[J]. Journal of Computational Physics, 1988,79:12-49.
[10] Allaire G, Jouve F, Toader A M. A level-set method for shape optimization[J]. C R Acad Sci Paris, 2002,334:1125-1130.
[11] Amstutz S, Andra H. A new algorithm for topology optimization using a level-set method[J]. Journal of Computational Physics, 2006,216:573-588.
[12] Koch J R L, Papoutsis-Kiachagias E M, Giannakoglou K C. Transition from adjoint level set topology to shape optimization for 2D fluid mechanics[J]. Computers & Fluids, 2017,150:123-138.
[13] Challis V J, Guest J K. Level set topology optimization of fluids in Stokes flow[J]. Int J Numer Methods Engrg, 2009,79:1284-1308.
[14] Wang M Y, Wang X M, Guo D M. A level set method for structural topology optimization[J]. Comp Meth Appl Mech Eng, 2003,192:227-246.
[15] Duan X B, Ma Y C, Zhang R. Shape-topology optimization for Navier-Stokes problem using variational level set method[J]. J Comput Appl Math, 2008,222:487-499.
[16] Chan T, Vese L. Active contours without edges[J]. IEEE Trans Imag Proc, 2001,10:266-277.
[17] Adalsteinsson D, Sethian J A. A fast level set method for propagating interfaces[J]. Journal of Computational Physics, 1995,118:269-277.
[18] Peng D, Merriman B, Osher S, et al. A PDE-based fast local level set method[J]. Journal of Computational Physics, 1999,155:410-438.
[19] Sussman M, Almgren A S, Bell J B, et al. An adaptive level set approach for incompressible two-phase flows[J]. Journal of Computational Physics, 1999,148:81-124.
[20] Borrvall T, Petersson J. Topology optimization of fluid in Stokes flow[J]. Int J Numer Meth Fluid, 2003,41:77-107.
[21] 刘小民, 张彬. 基于改进水平集方法的翼型拓扑优化[J]. 工程热物理学报, 2012,33(4):607-610.
[22] 晏文璟, 侯江勇, 马逸尘. 耦合对流传热的 Stokes 流体形状优化设计[J]. 工程数学学报, 2012,29(3):437-450.
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