Mathematics (Jun 2021)

Linear Independence of T-Spline Blending Functions of Degree One for Isogeometric Analysis

  • Aizeng Wang,
  • Ling Li,
  • Wei Wang,
  • Xiaoxiao Du,
  • Feng Xiao,
  • Zhanchuan Cai,
  • Gang Zhao

DOI
https://doi.org/10.3390/math9121346
Journal volume & issue
Vol. 9, no. 12
p. 1346

Abstract

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Linear independence of the blending functions is a necessary requirement for T-spline in isogeometric analysis. The main work in this paper focuses on the analysis about T-splines of degree one, we demonstrate that all the blending functions of such T-spline of degree one are linearly independent. The advantage owned by one degree T-spline is that it can avoid the problem of judging whether the model is analysis-suitable or not, especially for occasions that need a quick response from the analysis results. This may provide a new way of using T-spline for a CAD and CAE integrating scenario, since one degree T-spline still guarantees the topology flexibility and is compatible with the spline-based modeling system. In addition, we compare the numerical approximations of isogeometric analysis and finite element analysis, and the experiment indicates that isogeometric analysis using T-spline of degree one can reach a comparable result with classical method.

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