TY - JOUR
T1 - Gauss-Galerkin quadrature rules for quadratic and cubic spline spaces and their application to isogeometric analysis
AU - Barton, Michael
AU - Calo, Victor M.
N1 - KAUST Repository Item: Exported on 2020-10-01
Acknowledgements: This publication was made possible in part by a National Priorities Research Program grant 7-1482-1-278 from the Qatar National Research Fund (a member of The Qatar Foundation), by the European Unions Horizon 2020 Research and Innovation Program under the Marie Sklodowska-Curie grant agreement No. 644602, and the Center for Numerical Porous Media at King Abdullah University of Science and Technology (KAUST). The first author has been partially supported by Bizkaia Talent under Grant AYD-000-270, by the Basque Government through the BERC 2014–2017 program, and by Spanish Ministry of Economy and Competitiveness MINECO: BCAM Severo Ochoa excellence accreditation SEV-2013-0323. The J. Tinsley Oden Faculty Fellowship Research Program at the Institute for Computational Engineering and Sciences (ICES) of the University of Texas at Austin has partially supported the visits of VMC to ICES.
PY - 2016/7/22
Y1 - 2016/7/22
N2 - We introduce Gaussian quadrature rules for spline spaces that are frequently used in Galerkin discretizations to build mass and stiffness matrices. By definition, these spaces are of even degrees. The optimal quadrature rules we recently derived (Bartoň and Calo, 2016) act on spaces of the smallest odd degrees and, therefore, are still slightly sub-optimal. In this work, we derive optimal rules directly for even-degree spaces and therefore further improve our recent result. We use optimal quadrature rules for spaces over two elements as elementary building blocks and use recursively the homotopy continuation concept described in Bartoň and Calo (2016) to derive optimal rules for arbitrary admissible numbers of elements.We demonstrate the proposed methodology on relevant examples, where we derive optimal rules for various even-degree spline spaces. We also discuss convergence of our rules to their asymptotic counterparts, these are the analogues of the midpoint rule of Hughes et al. (2010), that are exact and optimal for infinite domains.
AB - We introduce Gaussian quadrature rules for spline spaces that are frequently used in Galerkin discretizations to build mass and stiffness matrices. By definition, these spaces are of even degrees. The optimal quadrature rules we recently derived (Bartoň and Calo, 2016) act on spaces of the smallest odd degrees and, therefore, are still slightly sub-optimal. In this work, we derive optimal rules directly for even-degree spaces and therefore further improve our recent result. We use optimal quadrature rules for spaces over two elements as elementary building blocks and use recursively the homotopy continuation concept described in Bartoň and Calo (2016) to derive optimal rules for arbitrary admissible numbers of elements.We demonstrate the proposed methodology on relevant examples, where we derive optimal rules for various even-degree spline spaces. We also discuss convergence of our rules to their asymptotic counterparts, these are the analogues of the midpoint rule of Hughes et al. (2010), that are exact and optimal for infinite domains.
UR - http://hdl.handle.net/10754/617532
UR - http://linkinghub.elsevier.com/retrieve/pii/S0010448516300665
UR - http://www.scopus.com/inward/record.url?scp=85027920217&partnerID=8YFLogxK
U2 - 10.1016/j.cad.2016.07.003
DO - 10.1016/j.cad.2016.07.003
M3 - Article
SN - 0010-4485
VL - 82
SP - 57
EP - 67
JO - Computer-Aided Design
JF - Computer-Aided Design
ER -