Connectivity of Markoff mod-p graphs and maximal divisors

Abstract

Markoff mod-p graphs are conjectured to be connected for all primes p. In this paper, we use results of Chen and Bourgain, Gamburd, and Sarnak to confirm the conjecture for all p > 3.448·10392. We also provide a method that quickly verifies connectivity for many primes below this bound. In our study of Markoff mod-p graphs we introduce the notion of maximal divisors of a number. We prove sharp asymptotic and explicit upper bounds on the number of maximal divisors, which ultimately improves the Markoff graph p-bound by roughly 140 orders of magnitude as compared with an approach using all divisors.