Title of article
Studies of refinement and continuity in isogeometric structural analysis Original Research Article
Author/Authors
J.A. Cottrell، نويسنده , , Y. Bazilevs and T.J.R. Hughes، نويسنده , , A. Reali، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2007
Pages
24
From page
4160
To page
4183
Abstract
We investigate the effects of smoothness of basis functions on solution accuracy within the isogeometric analysis framework. We consider two simple one-dimensional structural eigenvalue problems and two static shell boundary value problems modeled with trivariate NURBS solids. We also develop a local refinement strategy that we utilize in one of the shell analyses. We find that increased smoothness, that is, the “k-method,” leads to a significant increase in accuracy for the problems of structural vibrations over the classical image-continuous “p-method,” whereas a judicious insertion of image-continuous surfaces about singularities in a mesh otherwise generated by the k-method, usually outperforms a mesh in which all basis functions attain their maximum level of smoothness. We conclude that the potential for the k-method is high, but smoothness is an issue that is not well understood due to the historical dominance of image-continuous finite elements and therefore further studies are warranted.
Keywords
k-Method , p-Method , Refinement , continuity , smoothness , Structural eigenvalue problems , Shells , Singularities , Isogeometric analysis , Finite element analysis
Journal title
Computer Methods in Applied Mechanics and Engineering
Serial Year
2007
Journal title
Computer Methods in Applied Mechanics and Engineering
Record number
894054
Link To Document