Markoff triples and generating pairs of SL2(Fp)

Abstract

Consider the level sets of the Markoff equation Mk: x2 + y2 + z2 - xyz - 2 = k. The phenomenon of strong approximation, as named by Bourgain, Gamburd, and Sarnak, predicts that every solution of Mk over Fp descends from a solution over Z. Moreover, we expect that the action of Vieta involutions (taking (x, y, z) to (yz-x, y, z), (x, xz-y, z), and (x, y, xy-z)) on Mk(Fp) is essentially transitive. In terms of matrices, Vieta involutions correspond to Nielsen moves in pairs (A, B) ∈ SL2(Fp) × SL2(Fp) for which tr([A, B]) = k. This correspondence is induced by \[Tr: (A, B) (tr(A), tr(B), tr(AB)).\] McCullough and Wanderley conjectured that Nielsen moves connect two pairs (A1, B1), (A2, B2) of generators of SL2(Fp) if and only if [A1, B1] is conjugate to [A2, B2] or [B2, A2]. Based on this, one expects that generating pairs (A, B) of SL2(Fp) for which tr([A, B]) = k determine a single orbit of Mk(Fp), and the remaining exceptional orbits come from non-generating pairs of SL2(Fp). In this article, we describe the set of exceptional orbits of Mk(Fp), showing that they agree with the finite orbits of the equation Mk over C found by Dubrovin and Mazzocco. Furthermore, we prove that the conjecture of McCullough and Wanderley is equivalent to strong approximation when p 3 4. Lastly, we present the recent developments of Chen on the problem and use our classification of exceptional orbits to make a divisibility conjecture about the size of the largest orbit of Mk(Fp).