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http://hdl.handle.net/10553/16442
Título: | A simple strategy for defining polynomial spline spaces over hierarchical T-meses | Autores/as: | Brovka, Marina López, J. I. Escobar Sánchez, José María Montenegro Armas, Rafael Cascón Barbero, José Manuel |
Clasificación UNESCO: | 1204 Geometría 1206 Análisis numérico |
Palabras clave: | Isogeometric analysis Multivariate splines Local refinement T-mesh Nested spaces |
Fecha de publicación: | 2016 | Proyectos: | Avances en Simulación de Campos de Viento y Radiación Solar. | Publicación seriada: | Computer Aided Design | Resumen: | We present a new strategy for constructing spline spaces over hierarchical T-meshes with quad- and octree subdivision schemes. The proposed technique includes some simple rules for inferring local knot vectors to define -continuous cubic tensor product spline blending functions. Our conjecture is that these rules allow to obtain, for a given T-mesh, a set of linearly independent spline functions with the property that spaces spanned by nested T-meshes are also nested, and therefore, the functions can reproduce cubic polynomials. In order to span spaces with these properties applying the proposed rules, the T-mesh should fulfill the only requirement of being a 0-balanced mesh. The straightforward implementation of the proposed strategy can make it an attractive tool for its use in geometric design and isogeometric analysis. In this paper we give a detailed description of our technique and illustrate some examples of its application in isogeometric analysis performing adaptive refinement for 2D and 3D problems. | URI: | http://hdl.handle.net/10553/16442 | ISSN: | 0010-4485 | DOI: | 10.1016/j.cad.2015.06.008 | Fuente: | Computer Aided Design [ISSN 0010-4485], v. 72, p. 140-156 | Derechos: | by-nc-nd |
Colección: | Artículos |
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