Computer aided (geometric) design

Introduction: de Casteljau algorithm, Bernstein form of Bezier curve, Bezier curves (general), Bezier splines, rational Bezier curves
Geometric continuity: geometric continuity of curves and surfaces, geometrically continuous splines
Bezier surfaces: tensor products, triangular patches, rational Bezier surfaces
Conics: rational quadratic Bezier curves, exact representation of conics
B-spline curves: properties, algorithms for manipulating B-spline curves

G. Farin: Curves and Surfaces for Computer Aided Geometric Design : A Practical Guide, 4th edition, Academic Press, San Diego, 1997.
C. de Boor: A Practical Guide to Splines, Springer, New York, 2001.
R. H. Bartels, J. C. Beatty, B. A. Barsky: An Introduction to Splines for Use in Computer Graphics and Geometric Modeling: Morgan Kaufmann, Palo Alto, 1996.
M.-J. Lai, L. L. Schumaker, Spline functions on triangulations, Cambridge University Press, 2007

An introduction to computer aided geometric design, use of Bezier curves and surfaces, rational Bezier curves and geometrically smooth splines.
With individual presentations and team work interactions within seminar/project activities students acquire communication and social competences for successful team work and knowledge transfer.

Knowledge and understanding:
Knowledge of basic facts on curves and surfaces. Basic programming skill in Matlab or Mathematica. Skill to implement algorithms in programming language.
Application:
Application of interpolation and approximation with polynomials and splines in CAGD.
Reflection:
Understanding theory based on application.
Transferable skills:
Skill of using theory in practical use. Skill of interconnecting knowledge from numerical mathematics, analysis and computer science. Critical judgement of differences between theory and practical applications.

Lectures, exercises, homeworks, consultations

Project
Oral exam
grading: 5 (fail), 6-10 (pass) (according to the Statute of UL)

Jan Grošelj:

• GROŠELJ, Jan, SPELEERS, Hendrik. Three recipes for quasi-interpolation with cubic Powell-Sabin splines. Computer Aided Geometric Design. Dec. 2018, vol. 67, str. 47-70 [COBISS-SI-ID 18516313]
• GROŠELJ, Jan, KNEZ, Marjetka. A B-spline basis for C1 quadratic splines on triangulations with a 10-split. Journal of Computational and Applied Mathematics. [Print ed.]. Dec. 2018, vol. 343, str. 413-427 [COBISS-SI-ID 18379609],

• GROŠELJ, Jan. A normalized representation of super splines of arbitrary degree on Powell-Sabin triangulations. BIT Numerical Mathematics. Dec. 2016, vol. 56, iss. 4, str. 1257-1280 [COBISS-SI-ID 17901657]
  Marjetka Knez:

• KNEZ, Marjetka. G1 motion interpolation using cubic PH biarcs with prescribed length. Computer Aided Geometric Design. Dec 2018, vol. 67, str. 21-33 [COBISS-SI-ID 18537561]

• KNEZ, Marjetka. Interpolation with spatial rational Pythagorean-hodograph curves of class 4. Computer Aided Geometric Design. Aug. 2017, vol. 56, str. 16-34 [COBISS-SI-ID 18144345]
• GROŠELJ, Jan, KNEZ, Marjetka. Interpolation with C2 quartic macro-elements based on 10-splits. Journal of Computational and Applied Mathematics. [Print ed.]. Dec. 2019, vol. 362, str. 143-160 [COBISS-SI-ID 18846809]
  Emil Žagar:

-VAVPETIČ, Aleš, ŽAGAR, Emil. A general framework for the optimal approximation of circular arcs by parametric polynomial curves. Journal of Computational and Applied Mathematics. [Print ed.]. 2019, vol. 345, str. 146-158 [COBISS-SI-ID 18388057]

-KNEZ, Marjetka, ŽAGAR, Emil. Interpolation of circular arcs by parametric polynomials of maximal geometric smoothness. Computer Aided Geometric Design. July 2018, vol. 63, str. 66-77 [COBISS-SI-ID 18372953]

• ŽAGAR, Emil. Circular sector area preserving approximation of circular arcs by geometrically smooth parametric polynomials. Journal of Computational and Applied Mathematics. [Print ed.]. July 2018, vol. 336, str. 63-71 [COBISS-SI-ID 18218329]