ThIS IS an English verSIOn of the book m two volumes, entitled "KeiJo Shon Kogaku (1), (2)" (Nikkan Kogyo Shinbun Co.) written in Japanese. The purpose of the book is a umfied and systematic exposition of the wealth of research results m the field of mathematical representation of curves and surfaces for computer aided geometric design that have appeared in the last thirty years. The material for the book started hfe as a set of notes for computer aided geometnc design courses which I had at the graduate schools of both computer SCIence, the umversity of Utah m U.S.A. and Kyushu Institute of Design in Japan. The book has been used extensively as a standard text book of curves and surfaces for students, practtcal engmeers and researchers. With the aim of systematic expositIOn, the author has arranged the book in 8 chapters: Chapter 0: The sIgmficance of mathemattcal representations of curves and surfaces is explained and histoncal research developments in this field are revIewed. Chapter 1: BasIc mathematical theones of curves and surfaces are reviewed and summanzed. Chapter 2: A classical mterpolation method, the Lagrange interpolation, is discussed.
Although its use is uncommon in practice, this chapter is helpful in understanding Chaps. 4 and 6. Chapter 3: This chapter dIscusses the Coons surface in detail, which is one of the most important contributions in this field. Chapter 4: The fundamentals of spline functions, spline curves and surfaces are discussed in some detail.
Auflage
Softcover reprint of the original 1st ed. 1988
Sprache
Verlagsort
Verlagsgruppe
Zielgruppe
Für Beruf und Forschung
Research
Illustrationen
Maße
Höhe: 244 mm
Breite: 170 mm
Dicke: 22 mm
Gewicht
ISBN-13
978-3-642-48954-9 (9783642489549)
DOI
10.1007/978-3-642-48952-5
Schweitzer Klassifikation
0. Mathematical Description of Shape Information.- 0.1 Description and Transmission of Shape Information.- 0.2 Processing and Analysis of Shapes.- 0.3 Mathematical Description of Free Form Shapes.- 0.4 The Development of Mathematical Descriptions of Free Form Curves and Surfaces.- References.- 1. Basic Theory of Curves and Surfaces.- 1.1 General.- 1.2 Curve Theory.- 1.3 Theory of Surfaces.- References.- 2. Lagrange Interpolation.- 2.1 Lagrange Interpolation Curves.- 2.2 Expression in Terms of Divided Differences.- References.- 3. Hermite Interpolation.- 3.1 Hermite Interpolation.- 3.2 Curves.- 3.3 Surfaces.- References.- 4. Spline Interpolation.- 4.1 Splines.- 4.2 Spline Functions.- 4.3 Mathematical Representation of Spline Functions.- 4.4 Natural Splines.- 4.5 Natural Splines and the Minimum Interpolation Property.- 4.6 Smoothing Splines.- 4.7 Parametric Spline Curves.- 4.8 End Conditions on a Spline Curve.- 4.9 Cubic Spline Curves Using Circular Arc Length.- 4.10 B-Splines.- 4.11 Generation of Spline Surfaces.- References.- 5. The Bernstein Approximation.- 5.1 Curves.- 5.2 Surfaces.- References.- 6. The B-Spline Approximation.- 6.1 Uniform Cubic B-Spline Curves.- 6.2 Uniform Bi-cubic B-Spline Surfaces.- 6.3 B-Spline Functions and Their Properties (1).- 6.4 B-Spline Functions and Their Properties (2).- 6.5 Derivation of B-Spline Functions.- 6.6 B-Spline Curve Type (1).- 6.7 B-Spline Curve Type (2).- 6.8 Recursive Calculation of B-Spline Functions.- 6.9 B-Spline Functions and Their Properties (3).- 6.10 B-Spline Curve Type (3).- 6.11 Differentiation of B-Spline Curves.- 6.12 Geometrical Properties of B-Spline Curves.- 6.13 Determination of a Point on a Curve by Linear Operations.- 6.14 Insertion of Knots.- 6.15 Curve Generation by Geometrical Processing.- 6.16 Interpolation of a Sequence of Points with a B-Spline Curve.- 6.17 Matrix Expression of B-Spline Curves.- 6.18 Expression of the Functions C0,0(t), C0,1(t), C1,0(t) and C1,1(t) by B-Spline Functions.- 6.19 General B-Spline Surfaces.- References.- 7. The Rational Polynomial Curves.- 7.1 Derivation of Parametric Conic Section Curves.- 7.2 Classification of Conic Section Curves.- 7.3 Parabolas.- 7.4 Circular Arc Formulas.- 7.5 Cubic/Cubic Rational Polynomial Curves.- 7.6 T-Conic Curves.- References.- Appendix A: Vector Expression of Simple Geometrical Relations.
