Splines for Meshes with Irregularities

Abstract: Splines form an elegant bridge between the continuous real world and the discrete computational world. Their tensor-product form lifts many univariate properties effortlessly to the surfaces, volumes and beyond. Irregularities, where the tensor-structure breaks down, therefore deserve attention-and provide a rich source of mathematical challenges and insights. This paper reviews and categorizes techniques for splines on meshes with irregularities. Of particular interest are quad-dominant meshes that can have n… Show more

“…For highercontinuity, such as G 2 , higher degree patches have been used such as the biseptic patches of [LS08b] and bi-sextic of Karčiuaskas & Peters [KP16]. [Pet19] provides an overview of such constructions.…”

Arbitrary topology meshes in geometric design and vector graphics

“…For highercontinuity, such as G 2 , higher degree patches have been used such as the biseptic patches of [LS08b] and bi-sextic of Karčiuaskas & Peters [KP16]. [Pet19] provides an overview of such constructions.…”

Arbitrary topology meshes in geometric design and vector graphics

Subdivision and G-Spline Hybrid Constructions for High-Quality Geometric and Analysis-Suitable Surfaces

CAD Model Details via Curved Knot Lines and Truncated Powers