Development and implementation of an isogeometric scaled boundary shell formulation
Development and implementation of an isogeometric scaled boundary shell formulation
dc.contributor.advisor | Klassen Markus | |
dc.contributor.author | Mathias Ferdinand Maria Reichle | |
dc.date.accessioned | 2021-06-24T22:54:25Z | |
dc.date.available | 2021-06-24T22:54:25Z | |
dc.date.issued | 2021-06-24 | |
dc.identifier | KOS-1048404809205 | |
dc.identifier.uri | http://hdl.handle.net/10467/96216 | |
dc.description.abstract | In the field of numerical structural analysis, shell formulations are generally proposed to model the mechanic response of thin curved structures. Typical approaches consist in the numerical approximation of the surface of the structure in order to develop the element stiffness matrix which is used in the framework of the finite element method (FEM). In this context, the thickness direction of the shell is included in the derivation of the element stiffness matrix which is the associated to translational and rotational degrees of freedom. In recent years, the scaled boundary method has been proposed to model thin structures such as plates and shells. The main idea of this approach consists in a solid shell formulation with scale separation. The in-plane direction is approximated in a classical sense by shape functions, but for the thickness direction, the analytic solution is taken into account. By these means, the nodal degrees of freedom are given by the displacements of the top and bottom surface of the shell. The objective of the present thesis is to develop and implement a scaled boundary shell formulation into the framework of isogeometric analysis (IGA). This framework offers the advantage of an exact approximation of a shell structure, since it is based on the NURBS functions which are used for the geometrical description. Furthermore, a higher continuity of the solution field is given naturally by means of these functions. The initial tasks of this project consist in the familiarization with the scaled boundary shell formulation as well as with IGA. Afterwards the element formulation needs to be derived and implemented into the IGA framework. To conclude the work, standard shell element benchmarks such as the pinched cylinder are to be performed and documented in the final written elaboration | cze |
dc.description.abstract | In the field of numerical structural analysis, shell formulations are generally proposed to model the mechanic response of thin curved structures. Typical approaches consist in the numerical approximation of the surface of the structure in order to develop the element stiffness matrix which is used in the framework of the finite element method (FEM). In this context, the thickness direction of the shell is included in the derivation of the element stiffness matrix which is the associated to translational and rotational degrees of freedom. In recent years, the scaled boundary method has been proposed to model thin structures such as plates and shells. The main idea of this approach consists in a solid shell formulation with scale separation. The in-plane direction is approximated in a classical sense by shape functions, but for the thickness direction, the analytic solution is taken into account. By these means, the nodal degrees of freedom are given by the displacements of the top and bottom surface of the shell. The objective of the present thesis is to develop and implement a scaled boundary shell formulation into the framework of isogeometric analysis (IGA). This framework offers the advantage of an exact approximation of a shell structure, since it is based on the NURBS functions which are used for the geometrical description. Furthermore, a higher continuity of the solution field is given naturally by means of these functions. The initial tasks of this project consist in the familiarization with the scaled boundary shell formulation as well as with IGA. Afterwards the element formulation needs to be derived and implemented into the IGA framework. To conclude the work, standard shell element benchmarks such as the pinched cylinder are to be performed and documented in the final written elaboration | eng |
dc.publisher | České vysoké učení technické v Praze. Vypočetní a informační centrum. | cze |
dc.publisher | Czech Technical University in Prague. Computing and Information Centre. | eng |
dc.rights | A university thesis is a work protected by the Copyright Act. Extracts, copies and transcripts of the thesis are allowed for personal use only and at one?s own expense. The use of thesis should be in compliance with the Copyright Act http://www.mkcr.cz/assets/autorske-pravo/01-3982006.pdf and the citation ethics http://knihovny.cvut.cz/vychova/vskp.html | eng |
dc.rights | Vysokoškolská závěrečná práce je dílo chráněné autorským zákonem. Je možné pořizovat z něj na své náklady a pro svoji osobní potřebu výpisy, opisy a rozmnoženiny. Jeho využití musí být v souladu s autorským zákonem http://www.mkcr.cz/assets/autorske-pravo/01-3982006.pdf a citační etikou http://knihovny.cvut.cz/vychova/vskp.html | cze |
dc.subject | Scaled Boundary Method | cze |
dc.subject | Isogeometric Analysis | cze |
dc.subject | Shell Analysis | cze |
dc.subject | Scaled Boundary Method | eng |
dc.subject | Isogeometric Analysis | eng |
dc.subject | Shell Analysis | eng |
dc.title | Development and implementation of an isogeometric scaled boundary shell formulation | cze |
dc.title | Development and implementation of an isogeometric scaled boundary shell formulation | eng |
dc.type | diplomová práce | cze |
dc.type | master thesis | eng |
dc.contributor.referee | Klinkel Sven | |
theses.degree.discipline | Building Structures | cze |
theses.degree.grantor | katedra mechaniky | cze |
theses.degree.programme | Civil Engineering | cze |
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Diplomové práce - 11132 [182]