A C^s-smooth mixed degree and regularity isogeometric spline space over planar multi-patch domains

TL;DR

This paper introduces a new $C^s$-smooth mixed degree and regularity isogeometric spline space over multi-patch domains, enabling efficient high-order PDE solutions with curved boundaries.

Contribution

It constructs a novel $C^s$-smooth spline space with mixed degrees and regularities, extending previous methods to curved multi-patch domains for isogeometric analysis.

Findings

Successfully applied to solve biharmonic and triharmonic equations

Achieves degree $p=2s+1$ with regularity $r=s$ near edges and vertices

Reduces degrees of freedom in patch interiors

Abstract

We construct over a given bilinear multi-patch domain a novel $C^s$-smooth mixed degree and regularity isogeometric spline space, which possesses the degree $p=2s+1$ and regularity $r=s$ in a small neighborhood around the edges and vertices, and the degree $\widetilde{p} \leq p$ with regularity $\widetilde{r} = \widetilde{p}-1 \geq r$ in all other parts of the domain. Our proposed approach relies on the technique [35], which requires for the $C^s$-smooth isogeometric spline space a degree at least $p=2s+1$ on the entire multi-patch domain. Similar to [35], the $C^s$-smooth mixed degree and regularity spline space is generated as the span of basis functions that correspond to the individual patches, edges and vertices of the domain. The reduction of degrees of freedom for the functions in the interior of the patches is achieved by introducing an appropriate mixed degree and regularity underlying spline space over $[0,1]^2$ to define the functions on the single patches. We further extend our construction with a few examples to the class of bilinear-like $G^s$ multi-patch parameterizations [33,35], which enables the design of multi-patch domains having curved boundaries and interfaces. Finally, the great potential of the $C^s$-smooth mixed degree and regularity isogeometric spline space for performing isogeometric analysis is demonstrated by several numerical examples of solving two particular high order partial differential equations, namely the biharmonic and triharmonic equation, via the isogeometric Galerkin method.