References
- Baker, E. (2017). Invertible Infinity II. Bridges 2017 Conference Art Exhibit. http://gallery.bridgesmathart.org/exhibitions/2017-bridges-conference/ellie-baker.
- Baker, E. (2020). Triply Invertible Toroidal Scarf. Bridges 2020 Virtual Conference Art Exhibit. http://gallery.bridgesmathart.org/exhibitions/2020-bridges-conference/ellie-baker.
- Baker, E., Baker, D., & Wampler, C. (2020). Infinitely invertible infinity. In C. Yackel, R. Bosch, E. Torrence, & K. Fenyvesi (Eds.), Proceedings of bridges 2020: Mathematics, Art, music, architecture, education, culture (pp. 83–92). Tessellations Publishing. http://archive.bridgesmathart.org/2020/bridges2020-83.html.
- Baker, E., Baker, D., & Wampler, C. (2021, April 20). Crafts, Math, and the Joy of Turning Things Inside Out, Gathering 4 Gardner Organization, Celebration of Mind talk. [Vídeo]. YouTube. https://www.youtube.com/watch?v=f82K5v8Ti7c&t=0s.
- Baker, E., & Wampler, C. (2017). Invertible infinity: A Toroidal fashion statement. In D. Swart, C. Séquin, & K. Fenyvesi (Eds.), Proceedings of bridges 2017: Mathematics, Art, music, architecture, education, culture (pp. 49–56). Tessellations Publishing. http://archive.bridgesmathart.org/2017/bridges2017-49.html.
- Heesch, H. (1968). Regulares Parkettierungsproblem. Westdeutscher Verlag. http://www.tessellations.org/tess-symmetry7.shtml.
- Richter-Gebert, J. (2012). iOrnament [computer software]. https://www.science-to-touch.com/en/iOrnament.html.
- Scharein, R. (1998–2022). Knot Zoo and Knotplot [computer software]. https://knotplot.com/zoo/ (As of January 23, 2020).
- Spoonflower. (n.d.). https://www.spoonflower.com/profiles/elliebaker.
- Surot. (2008, February 13). Turning a Punctured Torus Inside-out. Public domain, via Wikimedia Commons. Retrieved March 2, 2023, from .