Shape optimization and free boundaries
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Bibliographic Information
Shape optimization and free boundaries
(NATO ASI series, Series C . Mathematical and physical sciences ; v. 380)
Kluwer Academic Publishers, c1992
Available at / 19 libraries
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Library, Research Institute for Mathematical Sciences, Kyoto University数研
C-P(*)||NATO-C||38092075213
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"Proceedings of the NATO Advanced Study Institute and Séminaire de mathématiques supérieures on Shape Optimization and Free Boundaries, Montréal, Canada, June 25-July 13, 1990"--T.p. verso
Includes index
Description and Table of Contents
Description
Shape optimization deals with problems where the design or control variable is no longer a vector of parameters or functions but the shape of a geometric domain. They include engineering applications to shape and structural optimization, but also original applications to image segmentation, control theory, stabilization of membranes and plates by boundary variations, etc.
Free and moving boundary problems arise in an impressingly wide range of new and challenging applications to change of phase. The class of problems which are amenable to this approach can arise from such diverse disciplines as combustion, biological growth, reactive geological flows in porous media, solidification, fluid dynamics, electrochemical machining, etc.
The objective and orginality of this NATO-ASI was to bring together theories and examples from shape optimization, free and moving boundary problems, and materials with microstructure which are fundamental to static and dynamic domain and boundary problems.
Table of Contents
Free boundary problems in geochemistry (with an Appendix by Riccardo Ricci).- Shape derivatives and differentiability of Min Max.- Some free boundary problems with industrial applications.- Problèmes de surfaces libres en mécanique des fluides.- Numerical structural optimization via a relaxed formulation.- Optimal shape design with applications to aerodynamics.- Approximation and localization of attractors.- Shape sensitivity analysis of variational inequalities.- Diffusion with strong absorption.- An introduction to the mathematical theory of the porous medium equation.- Asymptotic behaviour near extinction points for a semilinear equation with strong absorption.- to shape optimization problems and free boundary problems.
by "Nielsen BookData"