The Markoff Group of Transformations in Prime and Composite Moduli

Abstract

The Markoff group of transformations is a group of affine integral morphisms, which is known to act transitively on the set of all positive integer solutions to the equation x2+y2+z2=xyz. The fundamental strong approximation conjecture for the Markoff equation states that for every prime p, the group acts transitively on the set X*(p) of non-zero solutions to the same equation over Z/pZ. Recently, Bourgain, Gamburd and Sarnak proved this conjecture for all primes outside a small exceptional set. In the current paper, we study a group of permutations obtained by the action of on X*(p), and show that for most primes, it is the full symmetric or alternating group. We use this result to deduce that acts transitively also on the set of non-zero solutions in a big class of composite moduli. Our result is also related to a well-known theorem of Gilman, stating that for any finite non-abelian simple group G and r3, the group Aut(Fr) acts on at least one Tr-system of G as the alternating or symmetric group. In this language, our main result translates to that for most primes p, the group Aut(F2) acts on a particular T2-system of PSL(2,p) as the alternating or symmetric group.