Designing Fair Curves and Surfaces: Shape Quality in Geometric Modeling and Computer-Aided DesignSIAM, 1 jan 1994 - 330 pagina's This state-of-the-art study of the techniques used for designing curves and surfaces for computer-aided design applications focuses on the principle that fair shapes are always free of unessential features and are simple in design. The authors define fairness mathematically, demonstrate how newly developed curve and surface schemes guarantee fairness, and assist the user in identifying and removing shape aberrations in a surface model without destroying the principal shape characteristics of the model. Aesthetic aspects of geometric modeling are of vital importance in industrial design and modeling, particularly in the automobile and aerospace industries. Any engineer working in computer-aided design, computer-aided manufacturing, or computer-aided engineering will want to add this volume to his or her library. Researchers who have a familiarity with basic techniques in computer-aided graphic design and some knowledge of differential geometry will find this book a helpful reference. It is essential reading for statisticians working on approximation or smoothing of data with mathematical curves or surfaces. |
Inhoudsopgave
3 | |
OT44_ch2 | 29 |
OT44_ch3 | 45 |
OT44_ch4 | 61 |
OT44_ch5 | 75 |
OT44_ch6 | 123 |
OT44_ch7 | 161 |
OT44_ch8 | 213 |
OT44_ch9 | 231 |
OT44_ch10 | 253 |
OT44_ch11 | 277 |
OT44_ch12 | 295 |
315 | |
Overige edities - Alles bekijken
Designing Fair Curves and Surfaces: Shape Quality in Geometric Modeling and ... Nickolas S. Sapidis Gedeeltelijke weergave - 1994 |
Designing Fair Curves and Surfaces: Shape Quality in Geometric Modeling and ... Nickolas S. Sapidis Geen voorbeeld beschikbaar - 1994 |
Veelvoorkomende woorden en zinsdelen
Aided algorithm allow angle applied approach approximation arc length B-spline Bézier blend bound boundary calculate changes circle circular Comput consider constraints construction containing continuity control patterns control points convex convex hull corner curvature curve cyclide defined definition derivative described determined direction discrete discussed distribution edge equal equation evaluation example facet sphere fairness fairness metric first four function geometric given initial interpolation intersection inversion iteration linear mathematical means mesh method metric minimizing monotone normal Note objective optimization original parameter patch planar points polygon positive possible problem produce properties radius respectively resulting segment shape shown in Fig shows side simple smooth solution space spline step surface tangent plane tangent vectors torus variation vary vectors vertex spheres vertices weight zero