Computations with finite index subgroups of PSL2(Z) using farey symbolss
Finite index subgroups of the modular group are of great arithmetic importance. Farey symbols, introduced by Ravi Kulkarni in 1991, are a tool for working with these groups. Given such a group F, a Farey symbol for Г is a certain finite sequence of rational numbers (representing vertices of a fundamental domain of Г) together with pairing information for the edges between the vertices. They are a compact way of encoding the information about the group and they provide a simple way to do calculations with the group. For example: calculating an independent set of generators and decomposing group elements into a word in these generators, finding coset representatives, elliptic points, and genus of the group, testing if the group is congruence, etc. We will discuss Farey Symbols and explicit algorithms for working with them.
Publication Source (Journal or Book title)
Advances in Algebra and Combinatorics
Kurth, C., & Long, L. (2008). Computations with finite index subgroups of PSL2(Z) using farey symbolss. Advances in Algebra and Combinatorics, 225-242. https://doi.org/10.1142/9789812790019_0015