Ropes, fractions, and moduli spaces

Abstract

This is an exposition of John H. Conway's tangle trick. We discuss what the trick is, how to perform it, why it works mathematically, and finally offer a conceptual explanation for why a trick like this should exist in the first place. The mathematical centerpiece is the relationship between braids on three strands and elliptic curves, and we a draw a line from the tangle trick back to work of Weierstrass, Abel, and Jacobi in the 19th century. For the most part we assume only a familiarity with the language of group actions, but some prior exposure to the fundamental group is beneficial in places.Comment: Expository article. 13 pages with 10 figures. Suitable for graduate students and advanced undergrads. Comments welcome! New in V2: error in Example 2.1 corrected, brief discussion of variants of the trick, acknowledgements adde