3642352448
Topological Derivatives in Shape Optimization [Repost] eBooks & eLearning
Posted by ChrisRedfield at Aug. 18, 2013
![Topological Derivatives in Shape Optimization [Repost]](https://pixhost.icu/avaxhome/d5/09/002809d5_medium.jpeg)
Antonio André Novotny, Jan Sokolowski - Topological Derivatives in Shape Optimization
Published: 2012-12-14 | ISBN: 3642352448 | PDF | 433 pages | 4 MB
Topological Derivatives in Shape Optimization (Repost) eBooks & eLearning
Posted by AvaxGenius at March 28, 2022
Topological Derivatives in Shape Optimization by Antonio André Novotny
English | PDF | 2013 | 422 Pages | ISBN : 3642352448 | 4.6 MB
The topological derivative is defined as the first term (correction) of the asymptotic expansion of a given shape functional with respect to a small parameter that measures the size of singular domain perturbations, such as holes, inclusions, defects, source-terms and cracks. Over the last decade, topological asymptotic analysis has become a broad, rich and fascinating research area from both theoretical and numerical standpoints.
Topological Derivatives in Shape Optimization (repost) eBooks & eLearning
Posted by interes at Dec. 30, 2014
Topological Derivatives in Shape Optimization (Interaction of Mechanics and Mathematics) by Antonio André Novotny and Jan Sokolowski
English | 2012-12-14 | ISBN: 3642352448 | PDF | 433 pages | 4,6 MB
English | 2012-12-14 | ISBN: 3642352448 | PDF | 433 pages | 4,6 MB
Topological Derivatives in Shape Optimization eBooks & eLearning
Posted by step778 at Jan. 6, 2020
Antonio André Andre Novotny, Jan Sokołowski, "Topological Derivatives in Shape Optimization"
2012 | pages: 423 | ISBN: 3642352448 | PDF | 4,2 mb
2012 | pages: 423 | ISBN: 3642352448 | PDF | 4,2 mb