Please use this identifier to cite or link to this item: http://hdl.handle.net/10553/16837
Title: Construction of polynomial spline spaces over quadtree and octree T-meshes
Authors: Brovka, M. 
López, J. I. 
Escobar, J. M. 
Cascón Barbero, José Manuel
Montenegro, R. 
UNESCO Clasification: 1206 Análisis numérico
1204 Geometría
Keywords: Isogeometric analysis
Multivariate splines
Local refinement
T-mesh
Nested spaces
Issue Date: 2014
Project: Avances en Simulación de Campos de Viento y Radiación Solar. 
Journal: Procedia Engineering 
Conference: 23rd International Meshing Roundtable (IMR) 
23rd International Meshing Roundtable, IMR 2014 
Abstract: We present a new strategy for constructing tensor product spline spaces over quadtree and octree T-meshes. The proposed technique includes some simple rules for inferring local knot vectors to define spline blending functions. These rules allow to obtain for a given T-mesh a set of cubic spline functions that span a space with nice properties: it can reproduce cubic polynomials, the functions are C2-continuous, linearly independent, and spaces spanned by nested T-meshes are also nested. 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 quadtree or octree.
URI: http://hdl.handle.net/10553/16837
ISSN: 1877-7058
DOI: 10.1016/j.proeng.2014.10.370
Source: Procedia engineering [ISSN 1877-7058], v. 82, p. 21-33
Rights: by-nc-nd
Appears in Collections:Actas de congresos
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