Finite Element Approximation for Optimal Shape Design: Theory and ApplicationsExplains how to speed the optimal shape design process using a computer. Outlines the problems inherent in optimal shape design and discusses methods of their solution. Concentrates on finite element approximation and describes numerical realization of optimization techniques. Treats optimal design problems via the optimal control theory when the state systems are governed by variational inequalities. Provides useful background information, followed by numerous approaches to optimal shape design, all supported by illustrative examples. Appendices provide algorithms and numerous examples and their calculations are included. |
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Page 95
... parameter h was 1/8 or 1/16 . The corresponding triangulation contains 128 or 512 elements . The dimension of the optimization problem is 9 or 17 , i.e. D ( h ) = 8 or D ( h ) = 16 . = The state problem contains 56 or 224 unknowns ...
... parameter h was 1/8 or 1/16 . The corresponding triangulation contains 128 or 512 elements . The dimension of the optimization problem is 9 or 17 , i.e. D ( h ) = 8 or D ( h ) = 16 . = The state problem contains 56 or 224 unknowns ...
Page 216
... parameter values Co , C1 and C2 defining the set U of admissible design vectors were chosen to be Co Parameters ε and p were set ε = 10-4 , p = 10−5 . The domain ( a ) was discretized using the ( D + 1 ) x ( +1 ) grid where D + 1 = 17 ...
... parameter values Co , C1 and C2 defining the set U of admissible design vectors were chosen to be Co Parameters ε and p were set ε = 10-4 , p = 10−5 . The domain ( a ) was discretized using the ( D + 1 ) x ( +1 ) grid where D + 1 = 17 ...
Page 329
... parameter systems , ( in Polish ) , Warsaw Technical University Publications , Prace Naukowe , Elektronika . Sokolowski , J. ( 1987a ) , Sensitivity analysis of control constrained optimal control problems for distributed parameter ...
... parameter systems , ( in Polish ) , Warsaw Technical University Publications , Prace Naukowe , Elektronika . Sokolowski , J. ( 1987a ) , Sensitivity analysis of control constrained optimal control problems for distributed parameter ...
Contents
Preliminaries | 1 |
Abstract setting of optimal shape design problem and | 28 |
Optimal shape design of systems governed by a unilateral | 53 |
Copyright | |
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Common terms and phrases
algorithm Appendix applied approximation boundary value problem C₁ Céa Computer constraints contact problems convex convex set cost functional defined denote design sensitivity analysis differentiable discrete domain elastic element method exist a subsequence Figure Find finite element finite element method follows formula given Glowinski Gm(a H¹(Î Haslinger Haug Hlaváček Ir(an ITERATION jEJk ji Eli Komkov Lagrange multipliers Lemma lim inf lim sup linear Lipschitz continuous lower semicontinuous matrix minimization Nečas Neittaanmäki nodes nonlinear programming nonsmooth Numerical results obtain optimal control optimal design optimal pair optimal shape design parameter Pironneau Proof results for Example Section sequence shape design problems Shape optimization Sokolowski solves P(a structural design structural optimization subgradient subset T(Un T₁ Theorem triangulation un(an variational inequality vector w₁ Zolesio г₁