56.03 Methoden im Bauingenieurwesen
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- Master's Thesis (4) (remove)
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- Dynamik (2)
- Asphalt (1)
- Bogenstaumauer (1)
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- Dynamische Analyse (1)
- Finite-Elemente-Methode (1)
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Die Arbeit befasst sich mit der österreichischen Bogenstaumauer Kölnbrein, die während des Ersteinstaus geschädigt wurde. Diese Schäden, sowie mögliche Ursachen sind anhand von Literaturquellen dokumentiert. Nach Erstellung eines Rechenmodells wurden, durch ein Randelementeprogramm, Rissfortschrittsberechnungen durchgeführt und mit dem realen Bauwerk verglichen. Zum Einsatz kamen die Anwendungen „OSM“, „FRANC3D“ und „BES“ der Cornell-University.
Scalarization methods are a category of multiobjective optimization (MOO) methods. These methods allow the usage of conventional single objective optimization algorithms, as scalarization methods reformulate the MOO problem into a single objective optimization problem. The scalarization methods analysed within this thesis are the Weighted Sum (WS), the Epsilon-Constraint (EC), and the MinMax (MM) method. After explaining the approach of each method, the WS, EC and MM are applied, a-posteriori, to three different examples: to the Kursawe function; to the ten bar truss, a common benchmark problem in structural optimization; and to the metamodel of an aero engine exit module.
The aim is to evaluate and compare the performance of each scalarization method that is examined within this thesis. The evaluation is conducted using performance metrics, such as the hypervolume and the generational distance, as well as using visual comparison.
The application to the three examples gives insight into the advantages and disadvantages of each method, and provides further understanding of an adequate application of the methods concerning high dimensional optimization problems.
In displacement oriented methods of structural mechanics may static and dynamic equilibrium conditions lead to large coupled nonlinear systems of equations. In many cases they are solved iteratively utilizing derivatives of Newton's method. Alternatively, the equations may be expressed in terms of the Karush-Kuhn-Tucker conditions of an optimization problem and, therefore, may be solved using methods of mathematical programming. To begin with, the work deals with the fundamentals of the formulation as optimization problem. In particular, the requirements of material nonlinearity and contact situations are analyzed. Proximately, an algorithm is implemented which utilizes the usually sparse structure of the Hessian matrix, whereby particularly the convergence behaviour is analyzed and adjusted. The implementation was tested using examples from statics and dynamics of large systems. The results are verified considering the accuracy comparing alternative solutions (e.g. explicit methods). The potential areas of application is shown and the efficiency of the method is evaluated.
Die vorliegende Arbeit beschäftigt sich mit der dynamischen Analyse der Sprottetalbrücke infolge aufgetretener Asphaltschäden. Sie beinhaltet die Erstellung eines FE-Modells, der Darstellung der theoretischen Grundlagen der Dynamik sowie die Auswertung von berechneten Eigenformen und Asphaltspannungen unter Berücksichtigung der derzeit gültigen Normen.