论文信息 - Locally Refinable Splines over Box-Partitions

Locally Refinable Splines over Box-Partitions

We address progressive local refinement of splines defined on axes parallel box-partitions and corresponding box-meshes in any space dimension. The refinement is specified by a sequence of mesh-rectangles (axes parallel hyperrectangles) in the mesh defining the spline spaces. In the 2-variate case a mesh-rectangle is a knotline segment. When starting from a tensor-mesh this refinement process builds what we denote an LR-mesh, a special instance of a box-mesh. On the LR-mesh we obtain a collection of hierarchically scaled B-splines, denoted LR B-splines, that forms a nonnegative partition of unity and spans the complete piecewise polynomial space on the mesh when the mesh construction follows certain simple rules. The dimensionality of the spline space can be determined using recent dimension formulas [9, 10]. Math Subject Classification: 65D07, 65D17

Tom Lyche | Tor Dokken | Kjell Fredrik Pettersen | T. Lyche | T. Dokken

[1] L. Schumaker. Spline Functions: Basic Theory , 1981 .

[2] David R. Forsey,et al. Hierarchical B-spline refinement , 1988, SIGGRAPH.

[3] B. Mourrain. On the dimension of spline spaces on planar T-subdivisions , 2010 .

[4] B. Simeon,et al. Adaptive isogeometric analysis by local h-refinement with T-splines , 2010 .

[5] Jiansong Deng,et al. Polynomial splines over hierarchical T-meshes , 2008, Graph. Model..

[6] Thomas J. R. Hughes,et al. Isogeometric Analysis: Toward Integration of CAD and FEA , 2009 .

[7] Nicholas S. North,et al. T-spline simplification and local refinement , 2004, SIGGRAPH 2004.

[8] Sintef Ict,et al. Isogeometric Representation and Analysis - Bridging the Gap between CAD and Analysis , 2009 .

[9] B. Simeon,et al. A hierarchical approach to adaptive local refinement in isogeometric analysis , 2011 .

[10] Falai Chen,et al. On the instability in the dimension of splines spaces over T-meshes , 2011, Comput. Aided Geom. Des..

[11] T. Hughes,et al. Isogeometric analysis : CAD, finite elements, NURBS, exact geometry and mesh refinement , 2005 .

[12] Jean-Marie Mirebeau,et al. Sharp asymptotics of the Lp approximation error for interpolation on block partitions , 2011, Numerische Mathematik.

[13] Larry L. Schumaker,et al. Spline spaces on TR-meshes with hanging vertices , 2011, Numerische Mathematik.