Print Email Facebook Twitter Component Mode Synthesis for geometrically nonlinear structures Title Component Mode Synthesis for geometrically nonlinear structures Author Wenneker, F. Contributor Tiso, P. (mentor) Faculty Mechanical, Maritime and Materials Engineering Department Precision and Microsystems Engineering Programme Engineering Mechanics Date 2013-11-11 Abstract In the field of computational physics and engineering, the introduction of computers opened a world of possibilities. The finite element method was developed in order to solve complex problems numerically. Over time, the method matured and structures in the field of engineering became more and more complex, resulting in large degree of freedom systems. Analyses on these systems can be a computationally heavy and expensive task, which led to the development of Component Mode Synthesis (CMS) techniques. These techniques generally consist of a combination of two other techniques: substructuring and Model Order Reduction (MOR). Substructuring is used to obtain the structural behaviour of large and/or complex structures by dividing them into several smaller and simpler substructures of which the structural behaviour is easier to determine. The global system is then obtained by assembly of the substructures. Using MOR, a full order model is approximated by a system of lower dimension by expressing the displacement field in terms of a set of reduced coordinates. In linear statics and dynamics problems, MOR is widely used. For nonlinear problems however, the same methods cannot be used. Two CMS techniques suitable for geometrically nonlinear structures are developed, based on the linear Craig-Bampton and Rubin methods. Both techniques use sets of component modes to approximate the displacement field. In this work, the methods are extended by adding additional component modes; modal derivatives. A modal derivative describes second-order nonlinear contributions of a vibration mode, when it is perturbed with the shape of another vibration mode. They can be systematically and cheaply computed once a reduction basis is formed for the linearised problem. The results will be presented and discussed. Subject Component Mode Synthesisgeometric nonlinearitysubstructuringmodal derivativesfinite elements To reference this document use: http://resolver.tudelft.nl/uuid:eafb2041-904b-407a-b45c-55c5c7657ae7 Part of collection Student theses Document type master thesis Rights (c) 2013 Wenneker, F. Files PDF EM_2013-029_Wenneker_Thesis.pdf 1.68 MB PPTX EM_2013-029_-_Wenneker_-_ ... ation.pptx 54.1 MB Close viewer /islandora/object/uuid:eafb2041-904b-407a-b45c-55c5c7657ae7/datastream/OBJ1/view