Markoff triples and Nielsen equivalence in SL2(Fp)

Abstract

In 2013, Darryl McCullough and Marcus Wanderley made a series of conjectures that describe the Nielsen equivalence classes and T2-equivalence classes of pairs of generators for SL2(Fq) and the Markoff equivalence classes of triples in Fq3 that solve x2+y2+z2=xyz+ for some ∈Fq. (The case =0 was originally conjectured by Baragar in 1991.) We prove that one of the McCullough-Wanderley conjectures, the "Q-Classification Conjecture" on Markoff triples, implies the others. Then we prove that the Q-Classification Conjecture holds if q=p is a prime such that 24,504,480 does not divide p2-1. More generally, for any integer d, we reduce the Q-Classification Conjecture for all primes p 1\,mod\,d to checking whether a roughly 2d× 2d matrix with entries in Q[] is invertible. We (and SageMath) perform this invertibility check for all prime powers d up to 17, hence the modulus 24,504,480=2lcm(1,2,…,17).

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