Reports de recerca
http://hdl.handle.net/2117/3949
2017-04-30T03:24:43ZFrom degenerate patches to triangular and trimmed patches
http://hdl.handle.net/2117/82258
From degenerate patches to triangular and trimmed patches
Vigo Anglada, Marc; Pla García, Núria; Brunet Crosa, Pere
CAD systems are usually based on a tensor product representation of free form surfaces. Trimmed patches provide a reasonable solution for the representation of general topologies, provided that the gap between equivalent trimming curves in the euclidean space is small enough. Several commercial CAD systems, however, represent certain non-rectangular surface regions through degenerate rectangular patches. Degenerate patches produce rendering artifacts and can lead to malfunctions in the subsequent geometric operations. In this paper, two algorithms for converting degenerate tensor-product patches into triangular and trimmed rectangular patches are presented. The algorithms are based on specific degree reduction algorithms for Bézier curves. In both algorithms, the final surface approximates the initial one in a quadratic sense while inheriting its boundary curves. In the second one, e-G^1 continuity is achieved. Approximation errors are analyzed and some examples are presented and discussed. Approximation errors can be arbitrarily decreased through the degree elevation of the degenerate patches.
2016-01-29T10:36:03ZVigo Anglada, MarcPla García, NúriaBrunet Crosa, PereCAD systems are usually based on a tensor product representation of free form surfaces. Trimmed patches provide a reasonable solution for the representation of general topologies, provided that the gap between equivalent trimming curves in the euclidean space is small enough. Several commercial CAD systems, however, represent certain non-rectangular surface regions through degenerate rectangular patches. Degenerate patches produce rendering artifacts and can lead to malfunctions in the subsequent geometric operations. In this paper, two algorithms for converting degenerate tensor-product patches into triangular and trimmed rectangular patches are presented. The algorithms are based on specific degree reduction algorithms for Bézier curves. In both algorithms, the final surface approximates the initial one in a quadratic sense while inheriting its boundary curves. In the second one, e-G^1 continuity is achieved. Approximation errors are analyzed and some examples are presented and discussed. Approximation errors can be arbitrarily decreased through the degree elevation of the degenerate patches.Procediments per a la gestió del Doctorat/Màster
http://hdl.handle.net/2117/2244
Procediments per a la gestió del Doctorat/Màster
Pladellorens Mallofré, Josep
Projecte presentat al 1r Premi a la Qualitat de la Gestió Universitària, convocat pel Consell Social de la UPC
2008-09-18T09:49:34ZPladellorens Mallofré, JosepProjecte presentat al 1r Premi a la Qualitat de la Gestió Universitària, convocat pel Consell Social de la UPC