Geometric continuity: a parametrization independent measure of continuity for computer aided geometric design (curves, surfaces, splines)
- Author:
- Anthony David Derose
Abstract
No abstract available.
Cited By
- Liu S, Jacobson A and Gingold Y (2014). Skinning cubic Bézier splines and Catmull-Clark subdivision surfaces, ACM Transactions on Graphics, 33:6, (1-9), Online publication date: 19-Nov-2014.
- Loop C Smooth spline surfaces over irregular meshes Proceedings of the 21st annual conference on Computer graphics and interactive techniques, (303-310)
- Bajaj C and Ihm I (1992). Algebraic surface design with Hermite interpolation, ACM Transactions on Graphics, 11:1, (61-91), Online publication date: 2-Jan-1992.
- Bloomenthal J and Shoemake K (2019). Convolution surfaces, ACM SIGGRAPH Computer Graphics, 25:4, (251-256), Online publication date: 2-Jul-1991.
- Bloomenthal J and Shoemake K Convolution surfaces Proceedings of the 18th annual conference on Computer graphics and interactive techniques, (251-256)
- Loop C and DeRose T (2019). Generalized B-spline surfaces of arbitrary topology, ACM SIGGRAPH Computer Graphics, 24:4, (347-356), Online publication date: 1-Sep-1990.
- Loop C and DeRose T Generalized B-spline surfaces of arbitrary topology Proceedings of the 17th annual conference on Computer graphics and interactive techniques, (347-356)
- Manocha D Regular curves and proper parametrizations Proceedings of the international symposium on Symbolic and algebraic computation, (271-276)
- Bajaj C and Ihm I Hermite interpolation of rational space curves using real algebraic surfaces Proceedings of the fifth annual symposium on Computational geometry, (94-103)
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