Space of C2-smooth geometrically continuous isogeometric functions on planar multi-patch geometries: Dimension and numerical experiments

We study the space of C-2-smooth isogeometric functions on bilinearly parameterized multi-patch domains Omega subset of R-2, where the graph of each isogeometric function is a multi patch spline surface of bidegree (d, d), d is an element of {5, 6}. The space is fully characterized by the equivalence of the C-2-smoothness of an isogeometric function and the G(2)-smoothness of its graph surface (cf. Groisser and Peters (2015), Kapl et al. (2015)). This is the reason to call its functions C-2-smooth geometrically continuous isogeometric functions. In particular, the dimension of this C-2-smooth isogeometric space is investigated. The study is based on the decomposition of the space into three subspaces and is an extension of the work Kapl and Vitrih (2017) to the multi-patch case. In addition, we present an algorithm for the construction of a basis, and use the resulting globally C-2-smooth functions for numerical experiments, such as performing L-2 approximation and solving triharmonic equation, on bilinear multi-patch domains. The numerical results indicate optimal approximation order. (C) 2017 Elsevier Ltd. All rights reserved.