Thomas Borrvall scite author profile

SUMMARYWe consider topology optimization of uids in Stokes ow. The design objective is to minimize a power function, which for the absence of body uid forces is the dissipated power in the uid, subject to a uid volume constraint. A generalized Stokes problem is derived that is used as a base for introducing the design parameterization. Mathematical proofs of existence of optimal solutions and convergence of discretized solutions are given and it is concluded that no regularization of the optimization problem is needed. The discretized state problem is a mixed ÿnite element problem that is solved by a preconditioned conjugate gradient method and the design optimization problem is solved using sequential separable and convex programming. Several numerical examples are presented that illustrate this new methodology and the results are compared to results obtained in the context of shape optimization of uids.

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Large-scale topology optimization in 3D using parallel computing

Borrvall

Petersson

2001

Computer Methods in Applied Mechanics and Engineering

182

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Topology optimization using regularized intermediate density control

Borrvall

Petersson

2001

Computer Methods in Applied Mechanics and Engineering

159

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Topology optimization of elastic continua using restriction

Borrvall

2001

Arch Computat Methods Eng

100

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Topology optimization of regions of Darcy and Stokes flow

Wiker

Klarbring

Borrvall

2006

Numerical Meth Engineering

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SUMMARYThis paper treats the topology optimization problem of obtaining an optimal layout of regions of Darcy and Stokes flow, where the objective is the total potential power functional representing average fluid pressure. It extends the work of Borrvall and Petersson, which concerned optimal layout of Stokes flow only. A generalization of Stokes' equations is derived and used as state constraints in the optimization problem. A proof of existence of solutions is provided, and it is seen that although the corresponding proof in Borrvall and Petersson does not need regularization, the present one does. It is also concluded that linear interpolations of state parameters will result in black and white (unfiltered) designs. The method is tested on an area-to-point flow problem of the type discussed by Bejan, where the influence of various parameters and numerical strategies on the design are studied.

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Thomas Borrvall

Topology optimization of fluids in Stokes flow

Large-scale topology optimization in 3D using parallel computing

Topology optimization using regularized intermediate density control

Topology optimization of elastic continua using restriction

Topology optimization of regions of Darcy and Stokes flow

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