Mathematics and fiber arts

Ideas from mathematics have been used as inspiration for fiber arts including quilt making, knitting, cross-stitch, crochet, embroidery and weaving. A wide range of mathematical concepts have been used as inspiration including topology, graph theory, number theory and algebra. Some techniques such as counted-thread embroidery are naturally geometrical; other kinds of textile provide a ready means for the colorful physical expression of mathematical concepts.

Quilting

The IEEE Spectrum has organized a number of competitions on quilt block design, and several books have been published on the subject. Notable quiltmakers include Diana Venters and Elaine Ellison, who have written a book on the subject Mathematical Quilts: No Sewing Required. Examples of mathematical ideas used in the book as the basis of a quilt include the golden rectangle, conic sections, Leonardo da Vinci's Claw, the Koch curve, the Clifford torus, San Gaku, Mascheroni's cardioid, Pythagorean triples, spidrons, and the six trigonometric functions.^[1]

Knitting and crochet

Knitted mathematical objects include the Platonic solids, Klein bottles and Boy's surface. The Lorenz manifold and the hyperbolic plane have been crafted using crochet.^[2][3] Knitted and crocheted tori have also been constructed depicting toroidal embeddings of the complete graph K₇ and of the Heawood graph.^[4] The crocheting of hyperbolic planes has been popularized by the Institute For Figuring; a book by Daina Taimina on the subject, Crocheting Adventures with Hyperbolic Planes, won the 2009 Bookseller/Diagram Prize for Oddest Title of the Year.^[5]

Embroidery

Embroidery techniques such as counted-thread embroidery^[6] including cross-stitch and some canvas work methods such as Bargello make use of the natural pixels of the weave, lending themselves to geometric designs.^[7][8]

Weaving

Ada Dietz (1882 – 1981) was an American weaver best known for her 1949 monograph Algebraic Expressions in Handwoven Textiles, which defines weaving patterns based on the expansion of multivariate polynomials.^[9]

J. C. P. Miller (1970) used the Rule 90 cellular automaton to design tapestries depicting both trees and abstract patterns of triangles.^[10]

Spinning

Margaret Greig was a mathematician who articulated the mathematics of worsted spinning.^[11]

Fashion design

The silk scarves from DMCK Designs' 2013 collection are all based on Douglas McKenna's space-filling curve patterns.^[12] The designs are either generalized Peano curves, or based on a new space-filling construction technique.^[13][14]

The Issey Miyake Fall-Winter 2010–2011 ready-to-wear collection designs from a collaboration between fashion designer Dai Fujiwara and mathematician William Thurston. The designs were inspired by Thurston's geometrization conjecture, the statement that every 3-manifold can be decomposed into pieces with one of eight different uniform geometries, a proof of which had been sketched in 2003 by Grigori Perelman as part of his proof of the Poincaré conjecture.^[15]

See also

• Mathematics and art

References

Further reading

• belcastro, sarah-marie; Yackel, Carolyn, eds. (2007). Making Mathematics with Needlework: Ten Papers and Ten Projects. A K Peters. ISBN 978-1-56881-331-8.
• Grünbaum, Branko; Shephard, Geoffrey C. (May 1980). "Satins and Twills: An Introduction to the Geometry of Fabrics". Mathematics Magazine. 53 (3): 139–161. doi:10.2307/2690105. hdl:10338.dmlcz/104026. JSTOR 2690105.
• Taimina, Daina (2009). Crocheting Adventures with Hyperbolic Planes. A K Peters. ISBN 978-1-56881-452-0.

External links

• Mathematical quilts
• Mathematical knitting
• Mathematical weaving
• Mathematical craft projects
• Wooly Thoughts Creations: Maths Puzzles & Toys
• Penrose tiling quilt
• Crocheting the Hyperbolic Plane: An Interview with David Henderson and Daina Taimina
• AMS Special Session on Mathematics and Mathematics Education in Fiber Arts (2005)

This page was last edited on 22 January 2024, at 06:50