Watertight conversion of trimmed CAD surfaces to Clough–Tocher splines

Kosinka, Jiří; Cashman, Thomas J.

doi:10.1016/j.cagd.2015.06.001

Cited by 17 publications

(29 citation statements)

References 22 publications

(29 reference statements)

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“…The dimension of S 1 2 (T ) is 9, which can be determined, for instance, using the concept of minimal determining sets [24]. A discussion on choosing the split-point S can be found in [22,32]. Although various options exist, the split-point is typically placed at the barycentre of T .…”

Section: Powell-sabin Macro-triangle and Continuity Conditionsmentioning

confidence: 99%

“…The positions of the quadrature points t i are determined by t i , the barycentric coordinate on the micro-edge SV i , i.e., 1,1 , p 1,0,1 , p 1,1,0 ) are shown. The error values, see (22), between the exact integrals and the results of the quadrature rule (red/green bullets; Table 1, top) are displayed.…”

Section: Gaussian Quadrature For Non-symmetric Powell-sabin Splitsmentioning

confidence: 99%

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On numerical quadrature for C1 quadratic Powell–Sabin 6-split macro-triangles

Bartoň

Kosinka

2019

Journal of Computational and Applied Mathematics

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The quadrature rule of Hammer and Stroud [16] for cubic polynomials has been shown to be exact for a larger space of functions, namely the C 1 cubic Clough-Tocher spline space over a macro-triangle if and only if the split-point is the barycentre of the macro-triangle [21]. We continue the study of quadrature rules for spline spaces over macro-triangles, now focusing on the case of C 1 quadratic Powell-Sabin 6-split macro-triangles. We show that the 3-node Gaussian quadrature(s) for quadratics can be generalised to the C 1 quadratic Powell-Sabin 6-split spline space over a macro-triangle for a two-parameter family of inner split-points, not just the barycentre as in [21]. The choice of the inner split-point uniquely determines the positions of the edge split-points such that the whole spline space is integrated exactly by a corresponding polynomial quadrature. Consequently, the number of quadrature points needed to exactly integrate this special spline space reduces from twelve to three.For the inner split-point at the barycentre, we prove that the two 3-node quadratic polynomial quadratures of Hammer and Stroud exactly integrate also the C 1 quadratic Powell-Sabin spline space if and only if the edge split-points are at their respective edge midpoints. For other positions of the inner and edge split-points we provide numerical examples showing that three nodes suffice to integrate the space exactly, but a full classification and a closed-form solution in the generic case remain elusive.

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Section: Powell-sabin Macro-triangle and Continuity Conditionsmentioning

confidence: 99%

Section: Gaussian Quadrature For Non-symmetric Powell-sabin Splitsmentioning

confidence: 99%

On numerical quadrature for C1 quadratic Powell–Sabin 6-split macro-triangles

Bartoň

Kosinka

2019

Journal of Computational and Applied Mathematics

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“…It is known that dim(S 1 3 (T )) = 12. A discussion on choosing the split point S can be found in [20,28]. Although various options exist, the split point is typically placed at the barycentre of T .…”

Section: Clough-tocher Macro-triangle and Continuity Conditionsmentioning

confidence: 99%

“…For later use, we now recall C 0 , C 1 , and C 2 continuity conditions between Bézier cubic triangles [20,23,29]. Let p i be a cubic Bézier triangle defined on T i , i = 0, 1, 2.…”

Section: Clough-tocher Macro-triangle and Continuity Conditionsmentioning

confidence: 99%

Gaussian quadrature for C1 cubic Clough–Tocher macro-triangles

Kosinka

Bartoň

2019

Journal of Computational and Applied Mathematics

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A numerical integration rule for multivariate cubic polynomials over n-dimensional simplices was designed by Hammer and Stroud [14]. The quadrature rule requires n + 2 quadrature points: the barycentre of the simplex and n + 1 points that lie on the connecting lines between the barycentre and the vertices of the simplex. In the planar case, this particular rule belongs to a two-parameter family of quadrature rules that admit exact integration of bivariate polynomials of total degree three over triangles. We prove that this rule is exact for a larger space, namely the C 1 cubic Clough-Tocher spline space over macro-triangles if and only if the split-point is the barycentre. This results into a factor of three reduction in the number of quadrature points needed to integrate the Clough-Tocher spline space exactly.

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“…First, each shape requires its own particular algorithm to simulate its behavior, and second, this information is unavailable in models generated from point clouds [30] or sets of scanned images [31]. In other words, there is a need to convert the trimmed surfaces of B-reps into a form that removes the gaps between adjacent faces and allows a homogeneous representation of shape [32]. In these cases, the best solution involves discretizing the model into a mesh of smaller elementary mesh cells of mesh elements (usually triangles) that approximates a geometric domain [33].…”

Section: Types Of Representationsmentioning

confidence: 99%