[1] K. Karčiauskas and J. Peters. High-quality surfaces. Computer-Aided Geometric Design, xx(x):xx-xx, xx 200567. in preparation. [ bib ]
[2] Meera Sitharam, Jörg Peters, and Yong Zhou. Solving minimal, wellconstrained, 3d geometric constraint systems: combinatorial optimization of algebraic complexity. Journal of symbolic computing, xx(x):1-20, xx 200x. [ bib ]
[3] A. Myles, K. Karčiauskas, and J. Peters. In Proceedings of, pages xx1-xx. ACM Press, 2007. [ bib ]
[4] Sukitti Punak, Juan Cendan, Sergei Kurenov, and Jörg Peters. Fatty tissue. In Proceedings of Medicine Meets Virtual Reality (MMVR) 16, Jan 2008, Long Beach,CA. Studies in Health Technology and Informatics (SHTI), IOS Press, Amsterdam. [ bib ]
[5] W. Boehm, H. Prautzsch, and Jorg Peters. Geometric concepts for geometric design. SIAM Review, 37(3):473-??, September 1995. [ bib | http ]
[6] J. Peters. Local generalized hermite interpolation by quartic C2 space curves. ACM Transactions on Graphics, 8(3):235-242, 1989. [ bib ]
[7] J. Peters. Fitting smooth parametric surfaces to 3D data. PhD thesis, University of Wisconsin, 1990. PhD thesis; see also CMS Technical Report 91-2. [ bib ]
[8] J. Peters. Local cubic and bicubic C1 surface interpolation with linearly varying boundary normal. Computer-Aided Geometric Design, 7:499-515, 1990. [ bib ]
[9] J. Peters. Local smooth surface interpolation: A classification. Computer-Aided Geometric Design, 7:191-195, 1990. [ bib ]
[10] J. Peters. The network simplex method on a multiprocessor. Networks, 20(7):845-859, 1990. [ bib ]
[11] J. Peters. Smooth mesh interpolation with cubic patches. Computer Aided Design, 22(2):109-120, 1990. [ bib ]
[12] J. Peters. Parametrizing singularly to enclose vertices by a smooth parametric surface. In MacKay and Kidd [111], pages 1-7. [ bib ]
[13] J. Peters. Smooth interpolation of a mesh of curves. Constructive Approximation, 7:221-247, 1991. Winner of SIAM Student Paper Competition 1989. [ bib ]
[14] J. Peters. Improving G1 surface joins by using a composite patch. In Warren [113], pages 345-354. [ bib ]
[15] A. Neff and J. Peters. C1 interpolation on higher-dimensional analogues of the 4-direction mesh. In Braess and Schumaker [112], pages 207-220. [ bib ]
[16] J. Peters. Joining smooth patches at a vertex to form a Ck surface. Computer-Aided Geometric Design, 9:387-411, 1992. [ bib ]
[17] J. Peters and M. Sitharam. Stability of interpolation from C1 cubics at the vertices of an underlying triangulation. SIAM Journal on Numerical Analysis, 20(2):528-533, 1992. [ bib ]
[18] J. Peters and M. Sitharam. On stability of m-variate C1 interpolation. Approximation Theory and its Applications, 8(4):17-32, 1992. [ bib ]
[19] J. Peters. Smooth free-form surfaces over irregular meshes generalizing quadratic splines. Computer-Aided Geometric Design, 10:347-361, 1993. [ bib ]
[20] C. M. Hoffmann and J. Peters. Geometric constraints of CAGD. In Dæhlen et al. [114], pages 369-376. [ bib ]
[21] J. Peters. A characterization of connecting maps as roots of the identity. Curves and Surfaces in Geometric Design, pages 369-376, 1994. [ bib ]
[22] J. Peters. Evaluation and approximate evaluation of the multivariate Bernstein-Bézier form on a regularly partitioned simplex. ACM Transactions on Mathematical Software, 20(4):460-480, December 1994. [ bib | http ]
Keywords: Bernstein-Bézier form; evaluation; multivariate; power form; subdivision
[23] J. Peters. Surfaces of arbitrary topology constructed from biquadratics and bicubics. In Sapidis [115], pages 277-293. [ bib ]
[24] T. N. T. Goodman and J. Peters. Bézier nets, convexity and subdivision on higher dimensional simplices. Computer-Aided Geometric Design, 12:53-65, 1995. [ bib ]
[25] J. Peters. Biquartic C1 spline surfaces over irregular meshes. Computer Aided Design, 27(12):895-903, December 1995. [ bib ]
[26] J. Peters. C2 surfaces built from zero sets of the 7-direction box spline. In Mullineux [116], pages 463-474. [ bib ]
[27] J. Peters. Smoothing polyhedra made easy. ACM Transactions on Graphics, 14(2):161-169, April 1995. [ bib ]
[28] J. Peters. C1-surface splines. SIAM Journal on Numerical Analysis, 32(2):645-666, 1995. [ bib ]
[29] R. Farouki and J. Peters. Smooth curve design with double-Tschirnhaus cubics. Annals of Numerical Mathematics, 3(1-4):63-82, Mar 1996. [ bib ]
[30] J. Peters. Curvature continuous spline surfaces over irregular meshes. Computer-Aided Geometric Design, 13(2):101-131, Feb 1996. [ bib ]
[31] J. Peters. Spline surfaces from irregular control meshes. Zeitschrift für Angewandte Mathematik und Mechanik, 76(1):69-72, 1996. Proceedings of ICIAM '95. [ bib ]
[32] G. Farin, editor. XXX. Springer Verlag, Berlin, 199x. [ bib ]
[33] C. Gonzalez. Interactive modeling using surface splines. In 1er Encuentro de Computacion, ENC 97, pages xx-xx. Sociedad Mexicana de Ciencia de la Computacion, 1997. Queretaro, Mexico. [ bib ]
[34] J. Peters and M. Wittman. Blending basic implicit shapes using trivariate box splines. In Goodman and Martin [117], pages 409-426. [ bib ]
[35] J. Peters and M. Wittman. Box-spline based CSG blends. In W. Bronsvort C. Hoffmann, editor, Proceedings of Fourth Symposium on Solid Modeling, pages 195-206. ACM Siggraph, May 1997. [ bib ]
[36] J. Peters and A. Nasri. Computing volumes of solids enclosed by recursive subdivision surfaces. Computer Graphics Forum, 16(3):C89-C94, September 1997. [ bib ]
[37] J. Peters. Interpolation regions for convex low degree polynomial curve segments. Advances in computational mathematics, 6(1):87-96, 1997. [ bib ]
[38] J. Peters. Smoothing polyhedra using trimmed bicubic NURBS. In G. Farin, H. Bieri, G. Brunnett, and T. De Rose, editors, Geometric Modelling. Springer Verlag, 1998. Dagstuhl 1996, by invitation. [ bib ]
[39] J. Peters and U. Reif. The simplest subdivision scheme for smoothing polyhedra. ACM Transactions on Graphics, 16(4):420-431, October 1997. [ bib ]
[40] C. Gonzalez-Ochoa, S. McCammon, and J. Peters. Computing moments of objects enclosed by piecewise polynomial surfaces. ACM Transactions on Graphics, 17(3):143-157, July 1998. [ bib ]
[41] J. Peters. Algorithm 783: Pcp2Nurb - smooth free-form surfacing with linearly trimmed bicubic B-splines. ACM Transactions on Mathematical Software, 24(3):261-267, September 1998. [ bib | http ]
Unrestricted control polyhedra facilitate modeling free-form surfaces of arbitrary topology and local patch-layout by allowing n-sided, possibly nonplanar, facets and m-valent vertices. By cutting off edges and corners, the smoothing of an unrestricted control polyhedron can be reduced to the smoothing of a planar-cut polyhedron. A planar-cut polyhedron is a generalization of the well-known tensor-product control structure. The routine Pcp2Nurb in turn translates planar-cut polyhedra to a collection of four-sided linearly trimmed bicubic B-splines and untrimmed biquadratic B-splines. The routine can thus serve as central building block for overcoming topological constraints in the mathematical modeling of smooth surfaces that are stored, transmitted, and rendered using only the standard representation in industry. Specifically, on input of a nine-point subnet of a planar-cut polyhedron, the routine outputs a trimmed bicubic NURBS patch. If the subnet does not have geometrically redundant edges, this patch joins smoothly with patches from adjacent subnets as a four-sided piece of a regular C1 surface. The patch integrates smoothly with untrimmed biquadratic tensor-product surfaces derived from subnets with tensor-product structure. Sharp features can be retained in this representation by using geometrically redundant edges in the planar-cut polyhedron. The resulting surface follows the outlines of the planar-cut polyhedron in the manner traditional tensor-product splines follow the outline of their rectilinear control polyhedron. In particular, it stays in the local convex hull of the planar-cut polyhedron.

Keywords: algorithms
[42] C. Gonzalez and J. Peters. The topological house, 1998. [ bib | .html ]
[43] J. Peters and U. Reif. Analysis of generalized B-spline subdivision algorithms. SIAM Journal on Numerical Analysis, 35(2):728-748, April 1998. [ bib ]
[44] J. Peters and U. Reif. The 42 equivalence classes of quadratic surfaces in affine n-space. Computer-Aided Geometric Design, 15:459-473, 1998. [ bib ]
[45] J. Peters and L. Kobbelt. The platonic spheroids. Technical Report 97-052, Dept of Computer Sciences, Purdue University, 1998. [ bib ]
[46] D. Nairn, J. Peters, and D. Lutterkort. Sharp, quantitative bounds on the distance between a polynomial piece and its Bézier control polygon. Computer-Aided Geometric Design, 16(7):613-633, Aug 1999. [ bib ]
[47] J. Peters. Some properties of subdivision derived from splines. In Schröder [120], pages 83-90. [ bib ]
[48] C. Gonzalez and J. Peters. Localized hierarchy surface splines. In S.N. Spencer J. Rossignac, editor, ACM Symposium on Interactive 3D Graphics, 1999. [ bib ]
[49] D. Lutterkort, J. Peters, and U. Reif. Polynomial degree reduction in the L2-norm equals best Euclidean approximation of Bézier coefficients. Computer-Aided Geometric Design, 16(7):607-612, Aug 1999. [ bib ]
[50] D. Lutterkort and J. Peters. Smooth paths in a polygonal channel. In Proceedings of the 15th annual symposium on Computational Geometry, pages 316-321, 1999. [ bib ]
[51] D. Lutterkort and J. Peters. Tight linear bounds on the distance between a spline and its B-spline control polygon. Numerische Mathematik, 89:735-748, May 2001. [ bib ]
[52] J. Peters and U. Reif. Least squares approximation of Bézier coefficients provides best degree reduction in the L2-norm. Journal of Approximation Theory, 104(1):90-97, May 2000. [ bib ]
[53] J. Peters. Patching Catmull-Clark meshes. In Kurt Akeley, editor, Siggraph 2000, Computer Graphics Proceedings, Annual Conference Series, pages 255-258. ACM Press / ACM SIGGRAPH / Addison Wesley Longman, 2000. [ bib | http ]
Named after the title, the PCCM transformation is a simple, explicit algorithm that creates large, smoothly joining bicubic Nurbs patches from a refined Catmull-Clark subdivision mesh. The resulting patches are maximally large in the sense that one patch corresponds to one quadrilateral facet of the initial, coarsest quadrilateral mesh before subdivision. The patches join parametrically C2 and agree with the Catmull-Clark limit surface except in the immediate neighborhood of extraordinary mesh nodes; in such a neighborhood they join at least with tangent continuity and interpolate the limit of the extraordinary mesh node. The PCCM transformation integrates naturally with array-based implementations of subdivision surfaces.

Keywords: CAD, Curves & Surfaces, Geometric Modeling
[54] J. Peters and G. Umlauf. Computing curvature bounds for bounded curvature subdivi sion. Computer-Aided Geometric Design, 18(5):455-462, 2001. [ bib ]
[55] D. Lutterkort and J. Peters. Linear envelopes for uniform B-spline curves. In Curves and Surfaces, St Malo, pages 239-246, 2000. [ bib ]
[56] J. Peters and G. Umlauf. Gaussian and mean curvature of subdivision surfaces. In R. Cipolla and R. Martin, editors, The Mathematics of Surfaces IX, pages 59-69. Springer, 2000. [ bib ]
[57] J. Peters. Smooth patching of refined triangulations. ACM Transactions on Graphics, 20(1):1-9, 2001. [ bib ]
[58] D. Lutterkort and J. Peters. Optimized refinable enclosures of multivariate polynomial pieces. Computer-Aided Geometric Design, 18(9):851-863, 2002. [ bib ]
[59] Alex Vlachos, Jorg Peters, Chas Boyd, and Jason L. Mitchell. Curved PN triangles. In 2001, Symposium on Interactive 3D Graphics, Bi-Annual Conference Series, pages 159-166. ACM Press, 2001. [ bib ]
[60] J. Peters. C2 free-form surfaces of degree (3,5). Computer-Aided Geometric Design, 19(2):113-126, 2002. [ bib ]
[61] J. Peters. Geometric continuity. In Handbook of Computer Aided Geometric Design, pages 193-229. Elsevier, 2002. [ bib ]
[62] J. Peters. Surface envelopes. CISE TR 01-2001, 2001. http://www.cise.ufl.edu/research/SurfLab/papers/. [ bib ]
[63] L.J. Shiue and J. Peters. Mesh mutation in programmable graphics hardware. Eurographics/Siggraph Hardware Workshop, page 1:10, 2003. http://www.cise.ufl.edu/research/SurfLab/papers/. [ bib ]
[64] J. Peters and X. Wu. On the optimality of piecewise linear max-norm enclosures based on slefes. In L. L. Schumaker, editor, proceedings of Curves and Surfaces, St Malo 2002. Vanderbilt Press, 2003. [ bib ]
[65] J. Peters. Smoothness, fairness and the need for better multi-sided patches. In R Goldman and R. Krasauskas, editors, Topics in Algebraic Geometry and Geometric Modeling, number 334. American Mathematical Society, Contemporary Mathematics, 2003. [ bib ]
[66] J. Peters. Efficient one-sided linearization of spline geometry. In M.J. Wilson and R.R. Martin, editors, Mathematics of Surfaces X, page 297:319. IMA, 2003. [ bib ]
[67] J. Peters and X. Wu. Sleves for planar spline curves. Computer Aided Geometric Design, 21(6):615-635, 2004. http://authors.elsevier.com/sd/article/S0167839604000615. [ bib ]
[68] A. Myles and J. Peters. Threading splines through 3d channels. Computer Aided Design, 37(2):139-148, 2004. [ bib ]
[69] J. Peters and L.J. Shiue. Combining 4- and 3-direction subdivision. ACM TOG, 23(4):980:1003, 2004. [ bib ]
[70] J. Peters and U. Reif. Shape characterization of subdivision surfaces - basic principles. Computer-Aided Geometric Design, 21(6):585-599, july 2004. [ bib ]
[71] K. Karciauskas, J. Peters, and U. Reif. Shape characterization of subdivision surfaces - case studies. Computer-Aided Geometric Design, 21(6):601-614, july 2004. [ bib ]
[72] X. Wu and J. Peters. Interference detection for subdivision surfaces. Computer Graphics Forum, Eurographics 2004, 23(3):577-585, 2004. [ bib ]
[73] K. Karciauskas and J. Peters. Polynomial C2 spline surfaces guided by rational multisided patches. In Tor Dokken B. Jüttler, editor, Computational Methods for Algebraic Spline Surfaces, Sept 29 - Oct 3 2003, Kefermarkt, Austria, pages 119-134. Springer, 2004. [ bib ]
[74] J. Peters. Mid-structures of subdividable linear efficient function enclosures linking curved and linear geometry. In Miriam Lucian and Marian Neamtu, editors, Proceedings of SIAM conference, Seattle, Nov 2003. Nashboro, 2004. [ bib ]
[75] Le-Jeng Shiue. Quasi-regular surface representation, 2004. Ph.D's Dissertation, Department of Computer and Information Science and Engineering, University of Florida. [ bib ]
[76] Le-Jeng Shiue, Pierre Alliez, Radu Ursu, and Lutz Kettner. A tutorial on cgal polyhedron for subdivision algorithms. In 2nd CGAL User Workshop, 2004. http://www.cgal.org/Tutorials/Polyhedron/. [ bib ]
[77] Le-Jeng Shiue and Jörg Peters. A mesh refinement library based on generic design. In Proceedings of the 43rd Annual ACM Southeast Conference, pages 1-104-1-108, 2005. [ bib ]
[78] I. Ginkel, J. Peters, and G. Umlauf. On normals and control nets. In The Mathematics of surfaces XI, pages 233-239, 2005. [ bib ]
[79] I. Ginkel, J. Peters, and G. Umlauf. Normals of subdivision surfaces and their control polyhedra. Computer-Aided Geometric Design, 24(2):112-116, Feb 2007. [ bib ]
[80] Le-Jeng Shiue, Ian Jones, and J. Peters. A realtime GPU subdivision kernel. In Marcus Gross, editor, Siggraph 2005, Computer Graphics Proceedings, Annual Conference Series, pages 1010-1015. ACM Press / ACM SIGGRAPH / Addison Wesley Longman, 2005. [ bib ]
[81] Le-Jeng Shiue and Jorg Peters. A pattern-based data structure for manipulating meshes with regular regions. In Proceedings of Graphics Interface 2005, pages 153-160, 2005. [ bib ]
[82] Le-Jeng Shiue and Jorg Peters. Mesh refinement based on euler encoding. In Proceedings of The International Conference on Shape Modeling and Applications 2005, pages 343-348, 2005. [ bib ]
[83] X. Wu and J. Peters. An accurate error measure for adaptive subdivision surfaces. In Proceedings of The International Conference on Shape Modeling and Applications 2005, pages 51-57, 2005. [ bib ]
[84] U. Reif and J. Peters. Topics in multivariate approximation and interpolation. In K. Jetter et al., editor, Structural Analysis of Subdivision Surfaces - A Summary, pages 149-190. Elsevier Science Ltd, 2005. [ bib ]
[85] Meera Sitharam, Jörg Peters, and Yong Zhou. Combinatorial optimization of algebraic complexity of. In Automated Deduction in Geometry, ADG 2004, pages 1-2, 2004. refereed conference talk and extended abstract. [ bib ]
[86] Jörg Peters, Meera Sitharam, Yong Zhou, and JianHua Fan. Algebraic and numeric challenges in modeling virus formation. In Presentation at Florida Bioinformatics Workshop 2005, 2005. poster. [ bib ]
[87] Jörg Peters, Meera Sitharam, Yong Zhou, and JianHua Fan. Elimination in generically rigid 3d geometric constraint systems. In Proceedings of Algebraic Geometry and Geometric Modeling,Nice, 27-29 September 2004, pages xx+1-16. Springer Verlag, 2005. [ bib ]
[88] K. Karčiauskas and J. Peters. Concentric tesselation maps and curvature continuous guided surfaces. Computer-Aided Geometric Design, 24(2):99-111, Feb 2007. [ bib ]
[89] A. Myles and J. Peters. Fast safe spline surrogates for large point clouds. In Proceedings Third International Symposium on 3D Data Processing, Visualization and Transmission, UNC, Chapel Hill, USA, pages 61-69, June 14-16 2006. [ bib ]
[90] J. Peters and S. Punak. volume xx, pages xx-xx, xx 2005. submitted. [ bib ]
[91] K. Karčiauskas and J. Peters. Surfaces with polar structure. Computing, 79:309-315, March 2007. [ bib ]
[92] J. Peters and X. Wu. On the local linear independence of generalized subdivision functions. SIAM J. Numer. Anal., 44(6):2389-2407, December 2006. [ bib ]
[93] Minho Kim, Sukitti Punak, Juan Cendan, Sergei Kurenov, and Jörg Peters. Exploiting graphics hardware for haptic authoring. In Proceedings of Medicine Meets Virtual Reality (MMVR) 14, Jan 25-27 2006, Long Beach,CA, pages 255-260. Studies in Health Technology and Informatics (SHTI), IOS Press, Amsterdam, 2006. [ bib ]
[94] Minho Kim, Tianyun Ni, Juan Cendan, Sergei Kurenov, and Jörg Peters. A haptic-enabled toolkit for illustration of procedures in surgery (tips). In Proceedings of Medicine Meets Virtual Reality (MMVR) 15, Feb 6-9 2007, Long Beach,CA, pages 209-214. Studies in Health Technology and Informatics (SHTI), IOS Press, Amsterdam, 2007. [ bib ]
[95] JC. Cendan, S. Kurenov, S. Punak, M. Kim, and J. Peters. Multimedia environment for customized teaching of surgical procedures. SAGES 2006 Emerging Technology Session, Dallas TX. 4/29/2006, 2006. [ bib ]
[96] Cendan JC, M. Kim, Kurenov S, and Peters J. Developing a multimedia environment for customized teaching of the adrenalectomy surgical procedure. Surgical Endoscopy, pages 10.1007/s00464-006-9119-2, Dec 2006. [ bib ]
[97] Sergei N. Kurenov, Sukitti Punak, Minho Kim, Jorg Peters, and Juan C. Cendan. Simulation for training with the autosuture endo stitch device. Surgical Innovation, 13(4):1-5, December 2006. [ bib ]
[98] Tianyun Ni, Ahmad H. Nasri, and J. Peters. Tuned ternary quad subdivision. In Geometric Modeling and Processing 2006, July 26 - 28, 2006, Pittsburgh, Pennsylvania, pages xx-xx. Springer Lecture Notes in Computer Science (LNCS), Springer Verlag, 2006. [ bib ]
[99] Tianyun Ni, Ahmad H. Nasri, and J. Peters. Ternary subdivision for quadrilateral meshes. Computer Aided Geometric Design, 24(6):361-370, Aug 2007. [ bib | http ]
[100] J. Peters and X. Wu. Net-to-surface distance of subdivision functions. JAT, page xx, 2006. to appear. [ bib ]
[101] K. Karčiauskas, A. Myles, and J. Peters. A C2 polar jet subdivision. In A. Scheffer and K. Polthier, editors, Proceedings of Symposium of Graphics Processing (SGP), June 26-28 2006, Cagliari, Italy, pages 173-180. ACM Press, 2006. [ bib ]
[102] Kestutis Karčiauskas and Jörg Peters. Bicubic polar subdivision. ACM Trans. Graph., 26(4):14, 2007. [ bib ]
[103] V. Picheny, N. Kim, R. Haftka, and J. Peters. Conservative estimation of probability of failure. In 11th AIAA/ISSMO Multidisciplinary Analysis and Optimization Conference, 2006. [ bib ]
[104] J. Peters, Raphael Haftka, Sukitti Punak, and JianHua Fan. Algebraic and feasibility constraints in engineering design. In DMII grantees conference, St. Louis, 2006. [ bib ]
[105] K. Karčiauskas and J. Peters. Parameterization transition for guided C2 surfaces of low degree. In Sixth AFA Conference on Curves and Surfaces Avignon, June 29-July 5, 2006, pages 183-192, April 2007. [ bib ]
[106] K. Karčiauskas and J. Peters. Guided C2 spline surfaces with V-shaped tessellation. In J. Winkler and R. Martin, editors, Mathematics of Surfaces, pages 233-244, 2007. [ bib ]
[107] K. Karčiauskas, A. Myles, and J. Peters. A C2 polar jet subdivision. In A. Scheffer and K. Polthier, editors, Proceedings of Symposium of Graphics Processing (SGP), June 26-28 2006, Cagliari, Italy, pages 173-180. ACM Press, 2006. [ bib ]
[108] K. Karčiauskas and J. Peters. Guided subdivision, 2005. http://www.cise.ufl.edu/research/SurfLab/papers.shtml. [ bib ]
[109] K. Karčiauskas and J. Peters. On the curvature of guided surfaces. Computer Aided Geometric Design, 25(2):69-79, feb 2008. [ bib ]
[110] K. Karčiauskas and J. Peters. Guided spline surfaces. Computer Aided Geometric Design, pages 1-20, 2007. to appear. [ bib ]
[111] S. MacKay and E. M. Kidd, editors. Graphics Interface '91, Calgary, Alberta, 3-7 June 1991: proceedings, 243 College St, 5th Floor, Toronto, Ontario M5T 2Y1, Canada, 1991. Canadian Information Processing Society. [ bib ]
[112] D. Braess and L. L. Schumaker, editors. Numerical methods in approximation theory, Volume 9, volume 105 of International series of numerical mathematics. Birkhäuser, Basel, Switzerland, 1992. [ bib ]
[113] Joseph D. Warren, editor. Curves and surfaces in computer vision and graphics III: 16-18 November 1992, Boston, Massachusetts, volume 1830 of Proceedings of SPIE-the International Society for Optical Engineering, Bellingham, WA, USA, 1992. SPIE, International Society for Optical Engineering. [ bib ]
[114] M. Dæhlen, T. Lyche, and L. L. Schumaker, editors. Mathematical methods in computer aided geometric design III, Nashville, TN, USA, 1994. Vanderbilt University Press. [ bib ]
[115] Nickolas S. Sapidis, editor. Designing fair curves and surfaces: shape quality in geometric modeling and computer-aided design. Society for Industrial and Applied Mathematics, Philadelphia, PA, USA, 1994. [ bib ]
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