Robust approximation error estimates for analysis-suitable G1 isogeometric multi-patch discretizations

Abstract

We prove p-robust approximation error estimates for H2-conforming isogeometric discretizations over planar multi-patch domains. Possible applications are fourth order boundary value problems, like the biharmonic equation or Kirchhoff-Love plates. Using Isogeometric Analysis, such conforming discretizations can be constructed effortlessly for the single-patch case. In order to obtain a globally H2-conforming discretization in the multi-patch case, the functions must be C1-smooth across the interfaces between the patches. To obtain optimal approximation properties, those C1-smooth spaces must also reproduce splines of sufficiently high degree for traces and transversal derivatives at all patch interfaces. Such constructions are based on some assumptions on the geometry. We restrict ourselves to the class of analysis-suitable G1 (AS-G1) multi-patch domains, which is the subset of C0-matching multi-patch domains that allows the definition of spline spaces that yield the necessary reproduction properties without the need to locally increase the degree. While approximation error estimates have been established for single-patch and C0 isogeometric multi-patch spaces, corresponding results for the C1 multi-patch setting have been missing. The resulting bounds on the approximation error depend on the geometry parameterization and on the Sobolev regularity of the target function, but are independent of the spline degree p.