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On Obtaining a Solution to Optimization Problems for Solid, Elastic Plates by Restriction of the Design Space*

On Obtaining a Solution to Optimization Problems for Solid, Elastic Plates by Restriction of the... The problem of minimizing the static compliance of a solid elastic plate, for given total plate volume, is considered. Nonexistence of solutions in the case of a design space consisting of thickness functions for an isotropic, homogeneous plate is identified as being caused by the nonclosedness of the corresponding set of responses (deflections). It is shown that existence can be obtained if a bound on the gradient of the thickness function is imposed. It is also shown that this restriction of the design space ensures the existence of solutions to a broad class of plate optimization problems, static as well as dynamic. http://www.deepdyve.com/assets/images/DeepDyve-Logo-lg.png Journal of Structural Mechanics Taylor & Francis

On Obtaining a Solution to Optimization Problems for Solid, Elastic Plates by Restriction of the Design Space*

Journal of Structural Mechanics , Volume 11 (4): 21 – Jan 1, 1983

On Obtaining a Solution to Optimization Problems for Solid, Elastic Plates by Restriction of the Design Space*

Journal of Structural Mechanics , Volume 11 (4): 21 – Jan 1, 1983

Abstract

The problem of minimizing the static compliance of a solid elastic plate, for given total plate volume, is considered. Nonexistence of solutions in the case of a design space consisting of thickness functions for an isotropic, homogeneous plate is identified as being caused by the nonclosedness of the corresponding set of responses (deflections). It is shown that existence can be obtained if a bound on the gradient of the thickness function is imposed. It is also shown that this restriction of the design space ensures the existence of solutions to a broad class of plate optimization problems, static as well as dynamic.

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References (33)

Publisher
Taylor & Francis
Copyright
Copyright Taylor & Francis Group, LLC
ISSN
0360-1218
DOI
10.1080/03601218308907455
Publisher site
See Article on Publisher Site

Abstract

The problem of minimizing the static compliance of a solid elastic plate, for given total plate volume, is considered. Nonexistence of solutions in the case of a design space consisting of thickness functions for an isotropic, homogeneous plate is identified as being caused by the nonclosedness of the corresponding set of responses (deflections). It is shown that existence can be obtained if a bound on the gradient of the thickness function is imposed. It is also shown that this restriction of the design space ensures the existence of solutions to a broad class of plate optimization problems, static as well as dynamic.

Journal

Journal of Structural MechanicsTaylor & Francis

Published: Jan 1, 1983

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