TY - JOUR
T1 - Geometric modeling, isogeometric analysis and the finite cell method
AU - Rank, E.
AU - Ruess, M.
AU - Kollmannsberger, S.
AU - Schillinger, D.
AU - Düster, A.
N1 - Funding Information:
This work has partially been supported by the Excellence Initiative of the German Federal and State Governments via the TUM International Graduate School of Science and Engineering. Schillinger has been supported by the Munich Centre for Advanced Computing (MAC) . This support is gratefully acknowledged.
PY - 2012/12/1
Y1 - 2012/12/1
N2 - The advent of isogeometric analysis (IGA) using the same basis functions for design and analysis constitutes a milestone in the unification of geometric modeling and numerical simulation. However, an important class of geometric models based on the CSG (Constructive Solid Geometry) concept such as trimmed NURBS surfaces do not fully support the isogeometric paradigm, since basis functions do not explicitly represent the boundary. The finite cell method (FCM) is a high-order fictitious domain method, which offers simple meshing of potentially complex domains into a structured grid of cuboid cells, while still achieving exponential rates of convergence for smooth problems. In the present paper, we first discuss the possibility to directly couple the finite cell method to CSG, without any necessity for meshing the three-dimensional domain, and then explore a combination of the best of the two approaches IGA and FCM, closely following ideas of the recently introduced shell FCM. The resulting . finite cell extension to isogeometric analysis achieves a truly straightforward transfer of a trimmed NURBS surface into an analysis suitable NURBS basis, while benefiting from the favorable properties of the high-order and high-continuity basis functions. Accuracy and efficiency of the new approach are demonstrated by a numerical benchmark, and its versatility is outlined by the analysis of different trimmed design variants of a brake disk.
AB - The advent of isogeometric analysis (IGA) using the same basis functions for design and analysis constitutes a milestone in the unification of geometric modeling and numerical simulation. However, an important class of geometric models based on the CSG (Constructive Solid Geometry) concept such as trimmed NURBS surfaces do not fully support the isogeometric paradigm, since basis functions do not explicitly represent the boundary. The finite cell method (FCM) is a high-order fictitious domain method, which offers simple meshing of potentially complex domains into a structured grid of cuboid cells, while still achieving exponential rates of convergence for smooth problems. In the present paper, we first discuss the possibility to directly couple the finite cell method to CSG, without any necessity for meshing the three-dimensional domain, and then explore a combination of the best of the two approaches IGA and FCM, closely following ideas of the recently introduced shell FCM. The resulting . finite cell extension to isogeometric analysis achieves a truly straightforward transfer of a trimmed NURBS surface into an analysis suitable NURBS basis, while benefiting from the favorable properties of the high-order and high-continuity basis functions. Accuracy and efficiency of the new approach are demonstrated by a numerical benchmark, and its versatility is outlined by the analysis of different trimmed design variants of a brake disk.
KW - Embedding domain method
KW - Fictitious domain method
KW - Finite cell method
KW - High-order methods
KW - Isogeometric analysis
KW - Thin-walled structures
UR - http://www.scopus.com/inward/record.url?scp=84869882093&partnerID=8YFLogxK
U2 - 10.1016/j.cma.2012.05.022
DO - 10.1016/j.cma.2012.05.022
M3 - Article
AN - SCOPUS:84869882093
SN - 0045-7825
VL - 249-252
SP - 104
EP - 115
JO - Computer Methods in Applied Mechanics and Engineering
JF - Computer Methods in Applied Mechanics and Engineering
ER -