Wing drag minimization by using measure theory
Author:
, , , , ,Year
: 2006
Abstract: In this article, the problem of determining the shape of a thin wing for minimum drag has been
examined. In order to determine the optimal shape, we have extended a measure theory-based method.
Using an embedding procedure, the problem of finding the optimal shape is reduced to one consisting
of minimizing a linear form over a set of positive measures. The resulting problem can be approximated
by a finite dimensional linear programming problem. The solution of this problem is used to construct
a nearly optimal shape. A numerical example is given to illustrate the method.
examined. In order to determine the optimal shape, we have extended a measure theory-based method.
Using an embedding procedure, the problem of finding the optimal shape is reduced to one consisting
of minimizing a linear form over a set of positive measures. The resulting problem can be approximated
by a finite dimensional linear programming problem. The solution of this problem is used to construct
a nearly optimal shape. A numerical example is given to illustrate the method.
Keyword(s): Keywords: Approximation theory,Incompressible potential flow equation,Linear programming,
Measure theory,Optimal shape design
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Wing drag minimization by using measure theory
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| contributor author | محمدهادی فراهی | en |
| contributor author | سیدحامد هاشمی مهنه | en |
| contributor author | اکبر هاشمی برزابادی | en |
| contributor author | Mohammad Hadi Farahi | fa |
| contributor author | - - | fa |
| contributor author | - - | fa |
| date accessioned | 2020-06-06T13:52:44Z | |
| date available | 2020-06-06T13:52:44Z | |
| date issued | 2006 | |
| identifier uri | http://libsearch.um.ac.ir:80/fum/handle/fum/3373013?locale-attribute=en | |
| description abstract | In this article, the problem of determining the shape of a thin wing for minimum drag has been examined. In order to determine the optimal shape, we have extended a measure theory-based method. Using an embedding procedure, the problem of finding the optimal shape is reduced to one consisting of minimizing a linear form over a set of positive measures. The resulting problem can be approximated by a finite dimensional linear programming problem. The solution of this problem is used to construct a nearly optimal shape. A numerical example is given to illustrate the method. | en |
| language | English | |
| title | Wing drag minimization by using measure theory | en |
| type | Journal Paper | |
| contenttype | External Fulltext | |
| subject keywords | Keywords: Approximation theory | en |
| subject keywords | Incompressible potential flow equation | en |
| subject keywords | Linear programming | en |
| subject keywords | Measure theory | en |
| subject keywords | Optimal shape design | en |
| journal title | Optimization Methods and Software | fa |
| pages | 0-0 | |
| journal volume | 0 | |
| journal issue | 0 | |
| identifier link | https://profdoc.um.ac.ir/paper-abstract-1009687.html | |
| identifier articleid | 1009687 |