Combinatorics of k-Farey graphs

Abstract

With an eye towards studying curve systems on low-complexity surfaces, we introduce and analyze the k-Farey graphs Fk and F≤slant k, two natural variants of the Farey graph in which we relax the edge condition to indicate intersection number =k or k, respectively. The former, Fk, is disconnected when k>1. In fact, we find that the number of connected components is infinite if and only if k is not a prime power. Moreover, we find that each component of Fk is an infinite-valence tree whenever k is even, and Aut(Fk) is uncountable for k>1. As for F≤slant k, Agol obtained an upper bound of 1+\p:p is a prime>k\ for both chromatic and clique numbers, and observed that this is an equality when k is either one or two less than a prime. We add to this list the values of k that are three less than a prime equivalent to 11\ (mod\ 12), and we show computer-assisted computations of many values of k for which equality fails.