%0 Journal Article %1 zou2020isogeometric %A Zou, Zhihui %A Scott, Michael. A. %A Miao, D. %A Bischoff, Manfred %A Oesterle, Bastian %A Dornisch, Wolfgang %D 2020 %J Computer Methods in Applied Mechanics and Engineering %K ISO IGA_SHELL ibb from:maltevonscheven article %R 10.1016/j.cma.2020.113283 %T An isogeometric Reissner–Mindlin shell element based on Bézier dual basis functions: Overcoming locking and improved coarse mesh accuracy %V 370 %X We develop a mixed geometrically nonlinear isogeometric Reissner–Mindlin shell element for the analysis of thin-walled structures that leverages Bézier dual basis functions to address both shear and membrane locking and to improve the quality of computed stresses. The accuracy of computed solutions over coarse meshes, that have highly non-interpolatory control meshes, is achieved through the application of a continuous rotational approach. The starting point of the formulation is the modified Hellinger–Reissner variational principle with independent displacement, membrane, and shear strains as the unknown fields. To overcome locking, the strain variables are interpolated with lower-order spline bases while the variations of the strain variables are interpolated with the corresponding Bézier dual bases. Leveraging the orthogonality property of the Bézier dual basis, the strain variables are condensed out of the system with only a slight increase in the bandwidth of the resulting linear system. The condensed approach preserves the accuracy of the non-condensed mixed approach but with fewer degrees of freedom. From a practical point of view, since the Bézier dual basis is completely specified through Bézier extraction, any spline space that admits Bézier extraction can utilize the proposed approach directly.

@article{zou2020isogeometric, abstract = {We develop a mixed geometrically nonlinear isogeometric Reissner–Mindlin shell element for the analysis of thin-walled structures that leverages Bézier dual basis functions to address both shear and membrane locking and to improve the quality of computed stresses. The accuracy of computed solutions over coarse meshes, that have highly non-interpolatory control meshes, is achieved through the application of a continuous rotational approach. The starting point of the formulation is the modified Hellinger–Reissner variational principle with independent displacement, membrane, and shear strains as the unknown fields. To overcome locking, the strain variables are interpolated with lower-order spline bases while the variations of the strain variables are interpolated with the corresponding Bézier dual bases. Leveraging the orthogonality property of the Bézier dual basis, the strain variables are condensed out of the system with only a slight increase in the bandwidth of the resulting linear system. The condensed approach preserves the accuracy of the non-condensed mixed approach but with fewer degrees of freedom. From a practical point of view, since the Bézier dual basis is completely specified through Bézier extraction, any spline space that admits Bézier extraction can utilize the proposed approach directly.}, added-at = {2021-03-09T13:41:01.000+0100}, author = {Zou, Zhihui and Scott, Michael. A. and Miao, D. and Bischoff, Manfred and Oesterle, Bastian and Dornisch, Wolfgang}, biburl = {https://puma.ub.uni-stuttgart.de/bibtex/2f1ba39871f4846264582ce648a4f1392/ibb-publication}, doi = {10.1016/j.cma.2020.113283}, interhash = {d651916200b718864e722ccd711781ea}, intrahash = {f1ba39871f4846264582ce648a4f1392}, journal = {Computer Methods in Applied Mechanics and Engineering}, keywords = {ISO IGA_SHELL ibb from:maltevonscheven article}, timestamp = {2021-03-09T12:41:01.000+0100}, title = {An isogeometric Reissner–Mindlin shell element based on Bézier dual basis functions: Overcoming locking and improved coarse mesh accuracy}, volume = { 370}, year = 2020 }