Geometry and Computation of Houndstooth (Pied-de-poule)

Aus de_evolutionary_art_org
Wechseln zu: Navigation, Suche


Reference

Loe M. G. Feijs: Geometry and Computation of Houndstooth (Pied-de-poule). In: Bridges 2012. Pages 299–306

DOI

Abstract

We apply a variety of geometric and computational tools to improve our understanding of the Houndstooth (Pied de poule) pattern. Although the pattern must have been known for centuries, it was made famous mostly by Christian Dior and is still frequently used in many variations. It is a non-exhaustible source of inspiration for fashion designers.

Extended Abstract

Bibtex

Used References

[1] Gerdes, P. African Basketry: Interweaving Art and Mathematics in Mozambique, Proc. Bridges (Coimbra) 2011.

[2] Gerdes, P. African Basketry: A Gallery of Twill-Plaited Designs and Patterns Lulu.com, (2008).

[3] Kolmogorov, A. (1968). ”Logical basis for information theory and probability theory”. IEEE Transactions on Information Theory 14 (5): 662 -664.

[4] M.C. Escher, the graphic work. Taschen 2001.

[5] Doris Schattschneider. M.C. Escher: Visions of Symmetry. W. H. Freeman (1992).

[6] Feijs,L. and Bartneck,C. (2009) Teaching Geom. Principles to Design Students. Dig. Cult.&Educ., 1(2), 104-115.

[7] Fejes T ́oth, L. (1964). Regular figures. New York,: Macmillan.

[8] Heesch, H. and Kienzle, O. (1963). Fl ̈achenschluss; System der Formen l ̈uckenlos aneinanderschliessender Flachteile. Berlin,: Springer.

[9] Verhoeff, T. 3D Turtle Geometry: Artwork, Theory, Program Equivalence and Symmetry. Int. J. of Arts and Technology, 3(2/3):288319 (2010).

[10] Seymour Papert. Mindstorms: children, computers, and powerful ideas. 2nd edition, 1993, Basic Books.


Links

Full Text

http://archive.bridgesmathart.org/2012/bridges2012-299.pdf

intern file

Sonstige Links

http://archive.bridgesmathart.org/2012/bridges2012-299.html