Andrew M. Baxter, Ron Umble
Published 2005-09-13, updated 2007-04-01Version 7
We give a complete solution of the following problem: Find, classify and count the (classes of) periodic orbits on an equilateral triangle. We prove that Fagnano's period 3 orbit is the only periodic orbit with odd period. A periodic orbit is either prime or some d-fold iterate thereof. We count prime and iterate periodic orbits of period $2n$ via a bijection with a certain partition of $n$, then count only prime orbits using the prime factorization of $n$.
Comments: Version 7: Minor edits made, some figures redrawn, Table 1 moved from appendix to body of text.
Why is Helfenstein's claim about equichordal points false?
Local Rigidity of Higher Rank Homogeneous Abelian Actions: a Complete Solution via the Geometric Method
Multifractal Analysis of Multiple Ergodic Averages
![QR code for arXiv:math/0509292 [math.DS]](http://oss.arxitics.com/images/favicon.svg)