English

Construction of analysis-suitable $G^1$ planar multi-patch parameterizations

Numerical Analysis 2017-06-13 v1

Abstract

Isogeometric analysis allows to define shape functions of global C1C^{1} continuity (or of higher continuity) over multi-patch geometries. The construction of such C1C^{1}-smooth isogeometric functions is a non-trivial task and requires particular multi-patch parameterizations, so-called analysis-suitable G1G^{1} (in short, AS-G1G^{1}) parameterizations, to ensure that the resulting C1C^{1} isogeometric spaces possess optimal approximation properties, cf. [7]. In this work, we show through examples that it is possible to construct AS-G1G^{1} multi-patch parameterizations of planar domains, given their boundary. More precisely, given a generic multi-patch geometry, we generate an AS-G1G^{1} multi-patch parameterization possessing the same boundary, the same vertices and the same first derivatives at the vertices, and which is as close as possible to this initial geometry. Our algorithm is based on a quadratic optimization problem with linear side constraints. Numerical tests also confirm that C1C^{1} isogeometric spaces over AS-G1G^{1} multi-patch parameterized domains converge optimally under mesh refinement, while for generic parameterizations the convergence order is severely reduced.

Keywords

Cite

@article{arxiv.1706.03264,
  title  = {Construction of analysis-suitable $G^1$ planar multi-patch parameterizations},
  author = {Mario Kapl and Giancarlo Sangalli and Thomas Takacs},
  journal= {arXiv preprint arXiv:1706.03264},
  year   = {2017}
}
R2 v1 2026-06-22T20:15:01.000Z