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Table des matières de ce fascicule | Article précédent | Article suivant
Dyn, N.; Levin, D.; Yad-Shalom, I.
Conditions for regular $B$-spline curves and surfaces. RAIRO - Modélisation mathématique et analyse numérique, 26 no. 1 (1992), p. 177-190
Texte intégral djvu | pdf | Analyses MR 1155006 | Zbl 0755.41009
URL stable: http://www.numdam.org/item?id=M2AN_1992__26_1_177_0
[1] C. DE BOOR, (1978), A Practical Guide to Splines, Springer-Verlag. MR 507062 | Zbl 0406.41003
[2] H. EDELSBRUNER, (1987), Algorithms in combinatorial geometry, Springer-Verlag. MR 904271 | Zbl 0634.52001
[3] J. M. LANE and R. F. RIESENFELD (1980), A theoretical development for the computer génération and display of piecewise polynomial surfaces, IEEE T. Pattern Anal. 2, 35-46. Zbl 0436.68063
[4] K. H. LAU, (1988), Conditions for avoiding loss of Geometric continuity on spline curves, Comput, Aided Geom. Design. 5, 209-214. MR 959605 | Zbl 0646.41009
[5] C. M. STONE and T. DEROSE, (1989), A geometric characterization of parametric cubic curves, ACM Trans. Graph. 8, 147-163. Zbl 0746.68102
[6] C. Y. WANG, (1981), Shape classification of the parametric cubic curve and parametric B-spline cubic curve, Comput. Aided Design. 13, 199-206.
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