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Geometrical optimization of a disc brake Lauren Feinstein Vladimir Kovalevsky Nicolas Begasse

Published byRosalyn Horton Modified over 9 years ago

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Presentation on theme: "Geometrical optimization of a disc brake Lauren Feinstein Vladimir Kovalevsky Nicolas Begasse"— Presentation transcript:

1 Geometrical optimization of a disc brake Lauren Feinstein lpf24@cornell.edu Vladimir Kovalevsky vk285@cornell.edu Nicolas Begasse nb442@cornell.edu

2 Presentation Overview Optimization Overview Disc Brake Analysis Response Surface Optimization

3 Design process Functional requirements Initial design Topologic optimization Parametric optimization

4 Problem statement

5 Example problem Variables ? Minimize displacement Bounded volume Bounded stress

6 Parametric optimization X = thickness of each portion 5 Variables Minimize displacement Bounded volume Bounded stress

7 Topologic optimization X = presence of each cell 27 variables Minimize displacement Bounded volume Bounded stress

8 Parametric with interpolation X = position of each point 8 variables Minimize displacement Bounded volume Maximum stress We use this one!

9 ANSYS Modeling (Reference) 80mm 60mm Symmetry 0.28 MPa

10 ANSYS Modeling (Optimization) 80mm 60mm 0.28 MPa Symmetry X 1 X 2

11 Ansys Results : Deflection OptimizedReference mm 9.2% Reduction

12 MPa OptimizedReference

13 Response Surface Optimization X 1 X 2 Displacement

14 Objective Function Formulation Optimization parameter Penalty functions for design variables Penalty functions for state variables Traditional Method ANSYS

15 Design of Experiments Angle 1 Angle 2

16 Kriging Algorithm x1 x2 Displacement

17 MISQP Mixed Integer Sequential Quadratic Programming Angle 1 Angle 2 Displacement

18 Candidate Point Validation Angle 1 Angle 2 Displacement

19 Thank you!

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